From a7695dd645841f2631fd246725ce03f0ed03f604 Mon Sep 17 00:00:00 2001 From: yunweilu Date: Wed, 19 Apr 2023 14:11:19 -0500 Subject: [PATCH 1/9] Added explanation --- examples/demo_cos2phi_qubit.ipynb | 15 ++++++++++++--- 1 file changed, 12 insertions(+), 3 deletions(-) diff --git a/examples/demo_cos2phi_qubit.ipynb b/examples/demo_cos2phi_qubit.ipynb index 3e52665..fec772e 100644 --- a/examples/demo_cos2phi_qubit.ipynb +++ b/examples/demo_cos2phi_qubit.ipynb @@ -107,6 +107,15 @@ "cos2phi_qubit = scq.Cos2PhiQubit.create()" ] }, + { + "cell_type": "markdown", + "metadata": {}, + "source": [ + "From figure above, we can see that cos2phi can be viewed as a $0-\\pi$ qubit with maximum disorder in shunt capacitors.\n", + "\n", + "Benifits of cos2phi qubit: When biased at half flux quantum, it is protected from dielectric loss, charge noise and flux noise. However, it suffers from inductive, see https://bpb-us-e1.wpmucdn.com/sites.northwestern.edu/dist/2/1168/files/2022/01/Xinyuan-You-2021.pdf page 80 for more details." + ] + }, { "cell_type": "markdown", "metadata": {}, @@ -181,7 +190,7 @@ "metadata": {}, "source": [ "### Potential energy\n", - "evaluated by setting $\\zeta=0$" + "evaluated for $\\zeta=0$" ] }, { @@ -13183,7 +13192,7 @@ ], "metadata": { "kernelspec": { - "display_name": "Python 3", + "display_name": "Python 3 (ipykernel)", "language": "python", "name": "python3" }, @@ -13197,7 +13206,7 @@ "name": "python", "nbconvert_exporter": "python", "pygments_lexer": "ipython3", - "version": "3.8.10" + "version": "3.8.3" } }, "nbformat": 4, From 253e185b43be2e567faf3d4e312be5336a396f19 Mon Sep 17 00:00:00 2001 From: San Date: Wed, 19 Apr 2023 16:40:24 -0500 Subject: [PATCH 2/9] checked by San --- examples/demo_qutip_fluxoniumcz.ipynb | 1186 ++----------------------- 1 file changed, 54 insertions(+), 1132 deletions(-) diff --git a/examples/demo_qutip_fluxoniumcz.ipynb b/examples/demo_qutip_fluxoniumcz.ipynb index 4fd3f8d..defeb11 100644 --- a/examples/demo_qutip_fluxoniumcz.ipynb +++ b/examples/demo_qutip_fluxoniumcz.ipynb @@ -15,14 +15,16 @@ "cell_type": "markdown", "metadata": {}, "source": [ - "Capacitive coupling of two fluxonium qubits $A$ and $B$ results in the addition of the term $g \\hat n_A \\hat n_B$ to the Hamiltonian. This coupling shifts the energy levels so that the $\\omega_{01\\to 02}$ transition frequency is detuned from the $\\omega_{11 \\to 12}$ transition frequency. This allows the $|11\\rangle \\to |12\\rangle$ transition to be driven without causing leakage from other states in the computational space. Following Nesterov et al., we consider a drive on only qubit $B$, which is expressed as the term $H_d = f(t)\\cos(\\omega_d t)\\hat n_B$ added to the Hamiltonian.\n", + "Capacitive coupling of two fluxonium qubits $A$ and $B$ results in the addition of the term $g \\hat n_A \\hat n_B$ ($\\hat n$ is the charge operator) to the Hamiltonian. This coupling shifts the energy levels so that the dressed (coupled) $\\omega_{01 \\to 02}$ transition frequency is detuned from the dressed (coupled) $\\omega_{11 \\to 12}$ transition frequency. Without the capacitive coupling between two qubits, the bare (uncoupled) $\\omega_{01 \\to 02}$ transition frequency is the same as the bare (uncoupled) $\\omega_{11 \\to 12}$ transition frequency. This allows the $|11\\rangle \\to |12\\rangle$ transition to be Rabi driven without causing leakage from other states in the computational space. Following Nesterov et al., we consider a case of selective drive on only qubit $B$, which is expressed as the term $H_d = f(t)\\cos(\\omega_d t)\\hat n_B$ added to the Hamiltonian.\n", "\n", - "Driving the $|11\\rangle\\to|12\\rangle$ transition for a full period causes the $|11\\rangle$ state to aquire a phase of $e^{i\\pi}=-1$, without affecting the other states in the computational subspace. This results in the application of $CZ = \\operatorname{diag}(1,1,1,-1)$ up to single-qubit $Z$ gates.\n", + "Driving the $|11\\rangle\\to|12\\rangle$ transition for a full period of Rabi oscillation causes the $|11\\rangle$ state to acquire a phase of $e^{i\\pi}=-1$, without affecting the other states in the computational subspace. This results in the application of $CZ = \\operatorname{diag}(1,1,1,-1)$ up to single-qubit $Z$ gates.\n", "\n", "The Hamiltonian of the two coupled fluxonia and the drive is\n", "$$\n", "H = 4E_{CA}\\hat n_A - E_{JA}\\cos(\\hat \\phi_A-\\pi) + \\frac{1}{2} E_{LA}\\hat \\phi_A^2 + g\\hat n_A\\hat n_B + 4E_{CB}\\hat n_B - E_{JB}\\cos(\\hat \\phi_B-\\pi) + \\frac{1}{2}E_{LB}\\hat \\phi_B^2 + f(t)\\cos(w_dt)\\hat n_B\n", - "$$" + "$$\n", + "\n", + "where all of the notations follow closely the cited paper." ] }, { @@ -40,6 +42,7 @@ "\n", "# experimental values borrowed from\n", "# [https://arxiv.org/abs/1802.03095]\n", + "# define fluxonium A\n", "qbta = scq.Fluxonium(\n", " EC=1.5,\n", " EJ=5.5,\n", @@ -49,16 +52,27 @@ " truncated_dim=10,\n", ")\n", "\n", - "qbtb = scq.Fluxonium(EC=1.2, EJ=5.7, EL=1.0, flux=0.5, cutoff=110, truncated_dim=10)\n", + "# define fluxonium B\n", + "qbtb = scq.Fluxonium(\n", + " EC=1.2,\n", + " EJ=5.7,\n", + " EL=1.0,\n", + " flux=0.5,\n", + " cutoff=110,\n", + " truncated_dim=10,\n", + ")\n", "\n", + "# define the common Hilbert space\n", "hilbertspace = scq.HilbertSpace([qbta, qbtb])\n", "\n", + "# add interaction between two qubits\n", "hilbertspace.add_interaction(\n", " g_strength=0.15,\n", " op1=qbta.n_operator,\n", " op2=qbtb.n_operator,\n", ")\n", "\n", + "# generate spectrum lookup table\n", "hilbertspace.generate_lookup()" ] }, @@ -125,9 +139,9 @@ "metadata": {}, "outputs": [], "source": [ - "#get the representation of the n_b operator in the dressed eigenbasis of the composite system\n", + "# get the representation of the n_b operator in the dressed eigenbasis of the composite system\n", "n_b = hilbertspace.op_in_dressed_eigenbasis(op=qbtb.n_operator)\n", - "#truncate the operator after expressing in the dressed basis to speed up the simulation\n", + "# truncate the operator after expressing in the dressed basis to speed up the simulation\n", "n_b = truncate(n_b, total_truncation)" ] }, @@ -164,11 +178,12 @@ "metadata": {}, "outputs": [], "source": [ + "# get dressed state 11 to 12 transition frequency\n", "omega_1112 = transition_frequency(idxs[3], idxs[4])\n", "\n", "# Gaussian pulse parameters optimized by hand\n", - "A = 0.022\n", - "tg = 100\n", + "A = 0.022 # GHz\n", + "tg = 100 # ns\n", "\n", "#Gaussian pulse envelope\n", "def drive_coeff(t: float, args: dict) -> float:\n", @@ -178,7 +193,8 @@ "(evals,) = hilbertspace[\"evals\"]\n", "# The factor of 2pi converts the energy to GHz so that the time is in units of ns\n", "diag_dressed_hamiltonian = (\n", - " 2 * np.pi * qt.Qobj(np.diag(evals), dims=[hilbertspace.subsystem_dims] * 2)\n", + " 2 * np.pi * qt.Qobj(np.diag(evals),\n", + " dims=[hilbertspace.subsystem_dims] * 2)\n", ")\n", "diag_dressed_hamiltonian_trunc = truncate(diag_dressed_hamiltonian, total_truncation)\n", "\n", @@ -203,9 +219,7 @@ "outputs": [ { "data": { - "text/plain": [ - "Text(0.5, 0, 't (ns)')" - ] + "text/plain": "Text(0.5, 0, 't (ns)')" }, "execution_count": 7, "metadata": {}, @@ -213,1112 +227,24 @@ }, { "data": { - "application/pdf": 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" }, + "metadata": {}, "output_type": "display_data" } ], "source": [ + "# array of time list\n", "tlist = np.linspace(0, 120, 200) # total time\n", "\n", "# This simulation is just for viewing the affect of the pulse\n", "result = qt.sesolve(\n", - " H_qbt_drive, qt.basis(20, hilbertspace.dressed_index(product_states[3])), tlist, e_ops=[state * state.dag() for state in states]\n", + " H_qbt_drive,\n", + " qt.basis(20, hilbertspace.dressed_index(product_states[3])),\n", + " tlist,\n", + " e_ops=[state * state.dag() for state in states]\n", ")\n", "\n", "for idx, res in zip(idxs, result.expect):\n", @@ -1342,9 +268,9 @@ "metadata": {}, "outputs": [], "source": [ - "prop = qt.propagator(H_qbt_drive, tlist)[\n", - " -1\n", - "] # get the propagator at the final time step\n", + "# get the propagator at the final time step\n", + "prop = qt.propagator(H_qbt_drive, tlist)[-1] \n", + "\n", "# truncate the propagator to the computational subspace\n", "Uc = qt.Qobj(\n", " [\n", @@ -1364,7 +290,6 @@ "def remove_global_phase(op):\n", " return op * np.exp(-1j * cmath.phase(op[0, 0]))\n", "\n", - "\n", "# The process for obtaining the Z rotations is taken from page 3 of Nesterov et al., at the\n", "# bottom of the paragraph beginning, \"To model gate operation...\"\n", "def dphi(state):\n", @@ -1380,21 +305,8 @@ "outputs": [ { "data": { - "text/latex": [ - "Quantum object: dims = [[2, 2], [2, 2]], shape = (4, 4), type = oper, isherm = False\\begin{equation*}\\left(\\begin{array}{*{11}c}1.000 & (-7.352\\times10^{-08}+9.497\\times10^{-08}j) & (3.995\\times10^{-05}+2.183\\times10^{-05}j) & (-8.539\\times10^{-07}+2.828\\times10^{-08}j)\\\\(7.019\\times10^{-08}+9.487\\times10^{-08}j) & 0.996 & (-2.175\\times10^{-06}+6.467\\times10^{-06}j) & (7.574\\times10^{-05}-2.006\\times10^{-05}j)\\\\(-3.997\\times10^{-05}+2.179\\times10^{-05}j) & (9.747\\times10^{-07}+3.012\\times10^{-06}j) & 1.000 & (-3.475\\times10^{-06}-6.600\\times10^{-07}j)\\\\(2.421\\times10^{-07}+1.489\\times10^{-07}j) & (7.023\\times10^{-05}+3.479\\times10^{-05}j) & (-3.537\\times10^{-06}-4.982\\times10^{-08}j) & (-0.978-0.200j)\\\\\\end{array}\\right)\\end{equation*}" - ], - "text/plain": [ - "Quantum object: dims = [[2, 2], [2, 2]], shape = (4, 4), type = oper, isherm = False\n", - "Qobj data =\n", - "[[ 9.99997558e-01+0.00000000e+00j -7.35241089e-08+9.49725526e-08j\n", - " 3.99463511e-05+2.18320693e-05j -8.53948251e-07+2.82839237e-08j]\n", - " [ 7.01944586e-08+9.48664959e-08j 9.95520147e-01+0.00000000e+00j\n", - " -2.17470260e-06+6.46731036e-06j 7.57443646e-05-2.00623781e-05j]\n", - " [-3.99721921e-05+2.17851550e-05j 9.74663842e-07+3.01235561e-06j\n", - " 9.99620205e-01+0.00000000e+00j -3.47478033e-06-6.59973133e-07j]\n", - " [ 2.42061473e-07+1.48908800e-07j 7.02332015e-05+3.47883383e-05j\n", - " -3.53709345e-06-4.98170250e-08j -9.77936404e-01-2.00098574e-01j]]" - ] + "text/plain": "Quantum object: dims = [[2, 2], [2, 2]], shape = (4, 4), type = oper, isherm = False\nQobj data =\n[[ 9.99997558e-01+0.00000000e+00j 7.35241090e-08-9.49725529e-08j\n 3.99463511e-05+2.18320693e-05j -8.53948262e-07+2.82839250e-08j]\n [-7.01944586e-08-9.48664962e-08j 9.95520147e-01+0.00000000e+00j\n 2.17470258e-06-6.46731035e-06j -7.57443647e-05+2.00623781e-05j]\n [-3.99721921e-05+2.17851550e-05j -9.74663830e-07-3.01235561e-06j\n 9.99620205e-01+0.00000000e+00j -3.47478033e-06-6.59973136e-07j]\n [ 2.42061470e-07+1.48908800e-07j -7.02332015e-05-3.47883383e-05j\n -3.53709345e-06-4.98170249e-08j -9.77936404e-01-2.00098574e-01j]]", + "text/latex": "Quantum object: dims = [[2, 2], [2, 2]], shape = (4, 4), type = oper, isherm = False $ \\\\ \\left(\\begin{matrix}1.000 & (7.352\\times10^{-08}-9.497\\times10^{-08}j) & (3.995\\times10^{-05}+2.183\\times10^{-05}j) & (-8.539\\times10^{-07}+2.828\\times10^{-08}j)\\\\(-7.019\\times10^{-08}-9.487\\times10^{-08}j) & 0.996 & (2.175\\times10^{-06}-6.467\\times10^{-06}j) & (-7.574\\times10^{-05}+2.006\\times10^{-05}j)\\\\(-3.997\\times10^{-05}+2.179\\times10^{-05}j) & (-9.747\\times10^{-07}-3.012\\times10^{-06}j) & 1.000 & (-3.475\\times10^{-06}-6.600\\times10^{-07}j)\\\\(2.421\\times10^{-07}+1.489\\times10^{-07}j) & (-7.023\\times10^{-05}-3.479\\times10^{-05}j) & (-3.537\\times10^{-06}-4.982\\times10^{-08}j) & (-0.978-0.200j)\\\\\\end{matrix}\\right)$" }, "execution_count": 10, "metadata": {}, @@ -1416,9 +328,7 @@ "outputs": [ { "data": { - "text/plain": [ - "0.9906027020696448" - ] + "text/plain": "0.9906027020232415" }, "execution_count": 11, "metadata": {}, @@ -1429,6 +339,18 @@ "#fidelity measure given on page 3 of Nesterov et al.\n", "((Ucprime.dag() * Ucprime).tr() + np.abs((Ucprime.dag() * cz_gate()).tr()) ** 2) / 20" ] + }, + { + "cell_type": "code", + "execution_count": null, + "outputs": [], + "source": [], + "metadata": { + "collapsed": false, + "pycharm": { + "name": "#%%\n" + } + } } ], "metadata": { @@ -1457,4 +379,4 @@ }, "nbformat": 4, "nbformat_minor": 2 -} +} \ No newline at end of file From 06c29f2f4765fab5efc678a15b94005824d92628 Mon Sep 17 00:00:00 2001 From: Tianpu Zhao Date: Wed, 19 Apr 2023 18:17:31 -0500 Subject: [PATCH 3/9] Added additional info for zero-pi --- .DS_Store | Bin 0 -> 6148 bytes examples/demo_zeropi.ipynb | 21960 +---------------------------------- 2 files changed, 239 insertions(+), 21721 deletions(-) create mode 100644 .DS_Store diff --git a/.DS_Store b/.DS_Store new file mode 100644 index 0000000000000000000000000000000000000000..94e8e06d0b3c0eea52a799b60b44125cd5fb1383 GIT binary patch literal 6148 zcmeHKJ8Hu~5S?*U2;8_#xmWNF7NeX%7qG!0jV*_Sgp{gst{ly8K7<&_jUkPB12b=T zcHRoTLZcB8-F)oVA}bMT;fC^UVQO}6KCwk+6bQ#1uX2!QdH?L+hDr5&!niFsU$T?q zU;g1Vyu`ipL}sY~6`%rCfC^B7n-s9#3u~8wj8uRMP=Q|s?E6sQhBa{v^iKzZj{v|1 zX*aBWmH-w@0BhnHhzv}F3Jj{|h@nA8zGPiZ90P+cn!|_YlQkz4^{3kdX>d zflCD*V!N{b{{+7>|6h{0qXJamt`yLw>$?qJDSPYW<*e5h_!e$8KX5awor2))80hU7 g8*9gpUKDl3);O<;W1!QKcRG+i1Evd&3jDVMXN%qytN;K2 literal 0 HcmV?d00001 diff --git a/examples/demo_zeropi.ipynb b/examples/demo_zeropi.ipynb index 1c93b69..483a514 100644 --- a/examples/demo_zeropi.ipynb +++ b/examples/demo_zeropi.ipynb @@ -12,6 +12,13 @@ "---" ] }, + { + "cell_type": "markdown", + "metadata": {}, + "source": [ + "Set up Matplotlib for plotting into notebook, and import scqubits and numpy:" + ] + }, { "cell_type": "code", "execution_count": 1, @@ -36,17 +43,28 @@ ] }, { + "attachments": {}, "cell_type": "markdown", "metadata": {}, "source": [ - "# zero-pi qubit (decoupled from zeta-mode)" + "# $0$-$\\pi$ qubit (decoupled from $\\zeta$-mode)" ] }, { + "attachments": {}, "cell_type": "markdown", "metadata": {}, "source": [ - "$H=-2E_\\text{CJ}\\partial_\\phi^2+2E_{\\text{C}\\Sigma}(i\\partial_\\theta-n_g)^2-2E_\\text{J}\\cos\\theta\\cos(\\phi-\\varphi_\\text{ext}/2)+E_L\\phi^2+2E_\\text{J} +2E_{C\\Sigma}dC_J\\,\\partial_\\phi\\partial_\\theta + E_J dE_J \\sin\\theta\\sin(\\phi-\\phi_\\text{ext}/2)$" + "Neglecting ground capacitances, the $0$-$\\pi$ circuit has a pair of capacitors, a pair of linear inductors and a pair of Josephson junctions. The circuit has three modes: a transmon-like $\\theta$-mode, a fluxonium-like $\\phi$-mode and a spurious harmonic oscillator $\\zeta$-mode. When the capacitor pairs and the linear inductor pairs are identical, the $\\zeta$-mode is decoupled from the rest two. The Hamiltonian for the $0$-$\\pi$ circuit decoupled from the $\\zeta$-mode is\n", + "\\begin{align*}\n", + "H_{\\phi,\\theta}&=-2E_\\text{CJ}\\partial_\\phi^2+2E_{\\text{C}\\Sigma}(i\\partial_\\theta-n_g)^2-2E_\\text{J}\\cos\\theta\\cos(\\phi-\\varphi_\\text{ext}/2)+E_L\\phi^2+2E_\\text{J} \\\\\n", + "&+2E_{C\\Sigma}dC_J\\,\\partial_\\phi\\partial_\\theta + E_J dE_J \\sin\\theta\\sin(\\phi-\\phi_\\text{ext}/2),\n", + "\\end{align*}\n", + "where $\\varphi_{\\text{ext}} = 2\\pi\\Phi_{\\text{ext}}/\\Phi_0$ is the reduced external magnetic flux, $dC_J = 2(C_{J1} - C_{J2})/(C_{J1}+C_{J2})$ and $dE_J = 2(E_{J1} - E_{J2})/(E_{J1}+E_{J2})$\n", + "\n", + "
\n", + "\n", + "**Creation via GUI** (ipywidgets needs to be installed for this to work.)" ] }, { @@ -62,7 +80,7 @@ { "data": { "application/vnd.jupyter.widget-view+json": { - "model_id": "52b838faf6db4771a6e9f94f695622d1", + "model_id": "0471c36104f54d4bad4f52253e947e63", "version_major": 2, "version_minor": 0 }, @@ -76,7 +94,7 @@ { "data": { "application/vnd.jupyter.widget-view+json": { - "model_id": "dc7e8efa167241e192f053a2a75faee8", + "model_id": "bc5689a964a7472483b8481718a7d69d", "version_major": 2, "version_minor": 0 }, @@ -93,15 +111,18 @@ ] }, { + "attachments": {}, "cell_type": "markdown", "metadata": {}, "source": [ - "Diagonlization of zero-pi proceeds in a hybrid basis, using charge basis for $\\theta$ and discretization over a final interval for $\\phi$. (The latter explains the need for providing grid parameters.)" + "**Programmatic creation**\n", + "\n", + "Diagonlization of $0$-$\\pi$ proceeds in a hybrid basis, using charge basis for $\\theta$ and discretization over an interval for $\\phi$. (The latter explains the need for providing grid parameters.)" ] }, { "cell_type": "code", - "execution_count": 3, + "execution_count": 4, "metadata": { "ExecuteTime": { "end_time": "2020-03-27T12:55:37.604003Z", @@ -111,7 +132,8 @@ "outputs": [], "source": [ "zero_pi = scq.ZeroPi(\n", - " grid = scq.Grid1d(-6*np.pi, 6*np.pi, 200),\n", + " # reminder: the parameters for generating an 1D grid are (min_value, max_value, num_grid_points)\n", + " grid = scq.Grid1d(-6*np.pi, 6*np.pi, 200), \n", " EJ = 10.0,\n", " EL = 0.04,\n", " ECJ = 20.0,\n", @@ -124,19 +146,14 @@ }, { "cell_type": "code", - "execution_count": 4, - "metadata": { - "ExecuteTime": { - "end_time": "2020-03-27T13:04:09.028466Z", - "start_time": "2020-03-27T13:04:09.021450Z" - } - }, + "execution_count": 5, + "metadata": {}, "outputs": [ { "name": "stdout", "output_type": "stream", "text": [ - "ZeroPi--------------|\n", + "ZeroPi--------------| [ZeroPi_3]\n", " | EJ: 10.0\n", " | EL: 0.04\n", " | ECJ: 20.0\n", @@ -157,19437 +174,70 @@ "print(zero_pi)" ] }, + { + "attachments": {}, + "cell_type": "markdown", + "metadata": {}, + "source": [ + "Just like other qubits implemented in scqubits, parameters of $0$-$\\pi$ can be modified by either assiging values to the corresponding attributes, or through modifying values in the above GUI." + ] + }, { "cell_type": "code", - "execution_count": 5, - "metadata": { - "ExecuteTime": { - "end_time": "2020-02-07T03:22:25.523435Z", - "start_time": "2020-02-07T03:22:25.274049Z" - } - }, + "execution_count": 11, + "metadata": {}, + "outputs": [], + "source": [ + "zero_pi.flux = 0.31" + ] + }, + { + "attachments": {}, + "cell_type": "markdown", + "metadata": {}, + "source": [ + "An interesting alternative way to specify capacitive energies is to provide $E_{CJ}$ and $E_{C\\Sigma}$ (corresponds to the optional argument `ECS`) during the initialization. The $E_C$ value can also be changed by providing $E_{C\\Sigma}$ value in the following way:" + ] + }, + { + "cell_type": "code", + "execution_count": 10, + "metadata": {}, "outputs": [ { "data": { - "image/svg+xml": [ - "\r\n", - "\r\n", - "\r\n", - "\r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " 2021-07-06T06:42:30.468385\r\n", - " image/svg+xml\r\n", - " \r\n", - " \r\n", - " Matplotlib v3.3.4, https://matplotlib.org/\r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - 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" + "0.4081632653061224" ] }, - "metadata": { - "needs_background": "light" - }, - "output_type": "display_data" + "execution_count": 10, + "metadata": {}, + "output_type": "execute_result" } ], "source": [ - "### Potential energy for symmetric 0-$\\pi$ qubit\n", - "zero_pi.plot_potential();" + "zero_pi.set_EC_via_ECS(0.4)\n", + "zero_pi.EC" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - "### Eigenenergies" + "## Computing and plotting eigenenergies and wavefunctions" + ] + }, + { + "attachments": {}, + "cell_type": "markdown", + "metadata": {}, + "source": [ + "**Eigenenergies.** Similar to other qubits, eigenvalue computations and parameter sweeps can be performed using following methods:" ] }, { "cell_type": "code", - "execution_count": 6, + "execution_count": 7, "metadata": { "ExecuteTime": { "end_time": "2020-02-07T03:18:47.984128Z", @@ -19602,19 +252,18 @@ " 18.93031195, 19.16309846, 19.17777943, 19.92663351, 20.0898962 ])" ] }, - "execution_count": 6, + "execution_count": 7, "metadata": {}, "output_type": "execute_result" } ], "source": [ - "zero_pi.flux = 0.31\n", "zero_pi.eigenvals(evals_count=10)" ] }, { "cell_type": "code", - "execution_count": 7, + "execution_count": 16, "metadata": { "ExecuteTime": { "end_time": "2020-02-07T03:19:42.994539Z", @@ -19625,12 +274,12 @@ { "data": { "application/vnd.jupyter.widget-view+json": { - "model_id": "", + "model_id": "616668afb5f3409dbe28394570e7fea6", "version_major": 2, "version_minor": 0 }, "text/plain": [ - "HBox(children=(HTML(value='Spectral data'), FloatProgress(value=0.0, max=27.0), HTML(value='')))" + "Spectral data: 0%| | 0/27 [00:00\r\n", - "\r\n", - "\r\n", - "\r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " 2021-07-06T06:42:53.119401\r\n", - " image/svg+xml\r\n", - " \r\n", - " \r\n", - " Matplotlib v3.3.4, https://matplotlib.org/\r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " 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\n \n \n \n \n \n \n\n", "text/plain": [ - "
" + "
" ] }, "metadata": { @@ -20737,6 +304,97 @@ "zero_pi.plot_evals_vs_paramvals('flux', flux_list, evals_count=8);" ] }, + { + "attachments": {}, + "cell_type": "markdown", + "metadata": {}, + "source": [ + "**Matrix elements.** Similar to other qubits, matrix elements can be obtained and visualized as follows:" + ] + }, + { + "cell_type": "code", + "execution_count": 13, + "metadata": {}, + "outputs": [ + { + "data": { + "text/plain": [ + "array([[-0.05922139, 0.00525573, -0.00173534, -0.00314021, -0.06151892,\n", + " -0.05125716],\n", + " [ 0.00525573, -0.15354172, 0.00527505, -0.0056875 , 1.05065762,\n", + " 0.00665317],\n", + " [-0.00173534, 0.00527505, -0.08639363, -0.02892699, -0.02009053,\n", + " 0.01284532],\n", + " [-0.00314021, -0.0056875 , -0.02892699, -0.1198874 , 0.01334359,\n", + " 0.00595058],\n", + " [-0.06151892, 1.05065762, -0.02009053, 0.01334359, 0.13307501,\n", + " 0.03973421],\n", + " [-0.05125716, 0.00665317, 0.01284532, 0.00595058, 0.03973421,\n", + " -0.11209945]])" + ] + }, + "execution_count": 13, + "metadata": {}, + "output_type": "execute_result" + } + ], + "source": [ + "zero_pi.matrixelement_table(operator=\"n_theta_operator\",)" + ] + }, + { + "cell_type": "code", + "execution_count": 14, + "metadata": {}, + "outputs": [ + { + "data": { + "application/pdf": 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" ] @@ -21983,21 +445,71 @@ ] }, { + "attachments": {}, "cell_type": "markdown", "metadata": {}, "source": [ - "# Full zero-pi qubit (incl. zeta-mode)" + "**Visualizing potentials**" ] }, { "cell_type": "code", - "execution_count": 2, + "execution_count": 6, + "metadata": {}, + "outputs": [ + { + "data": { + "application/pdf": 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" + ] + }, + "metadata": { + "needs_background": "light" + }, + "output_type": "display_data" + } + ], + "source": [ + "zero_pi.plot_potential();" + ] + }, + { + "attachments": {}, + "cell_type": "markdown", + "metadata": {}, + "source": [ + "# Full $0$-$\\pi$ qubit (incl. $\\zeta$-mode)" + ] + }, + { + "attachments": {}, + "cell_type": "markdown", + "metadata": {}, + "source": [ + "When the capacitor and/or the inductor pairs are not identifcal, the $\\zeta$-mode couples to $\\theta$ and/or $\\phi$-mode. To accurately obtain spectral properties of such circuit, all three modes need to be taken into account. The full Hamiltonian is\n", + "\\begin{align*}\n", + "H&= H_{\\theta,\\phi} + H_{\\zeta} + H_{\\text{int}}\\\\\n", + "H_{\\zeta}&= \\omega_\\zeta a^\\dagger a\\\\\n", + "H_{\\text{int}}&= 2E_{\\text C \\Sigma } dC \\partial_\\theta \\partial_\\eta + E_{\\text L} dE_{\\text L} \\phi\\zeta \n", + "\\end{align*}\n", + "where $dC = 2(C_{1} - C_{2})/(C_{1}+C_{2})$ and $dL = 2(L_{1} - L_{2})/(L_{1}+L_{2})$.\n", + "\n", + "
\n", + "\n", + "**Creation via GUI** (ipywidgets needs to be installed for this to work.)" + ] + }, + { + "cell_type": "code", + "execution_count": 18, "metadata": {}, "outputs": [ { "data": { "application/vnd.jupyter.widget-view+json": { - "model_id": "c44000aa3d9a4e83af11eb126ffd5a21", + "model_id": "b31c431e5bd14401b8ca235555fa1188", "version_major": 2, "version_minor": 0 }, @@ -22011,7 +523,7 @@ { "data": { "application/vnd.jupyter.widget-view+json": { - "model_id": "7b117b0aa347499b90ca6508b162d060", + "model_id": "8551f283de65468bbaf960b7288d62a7", "version_major": 2, "version_minor": 0 }, @@ -22062,10 +574,16 @@ ] }, { - "cell_type": "code", - "execution_count": null, + "attachments": {}, + "cell_type": "markdown", + "metadata": {}, + "source": [ + "Notice that four basis cutoffs need to be specified: `ncut`, `zeropi_cutoff`, `zeta_cutoff` and `grid`. The diagonalization of the full $0$-$\\pi$ is carried out in the following way: the $H_{\\theta,\\phi}$ is diagonalized under the hybrid basis which are specified by `ncut` and `grid`. The lowest `zeropi_cutoff` energy eigenstates are then used to formulate a set of basis with the lowest `zeta_cutoff` energy eigenstates of $H_{\\zeta}$, which describes a harmonic oscillator. Finally, the full Hamiltonian $H$ is represented under the composite basis and diagonalized." + ] + }, + { + "cell_type": "markdown", "metadata": {}, - "outputs": [], "source": [] } ], @@ -22086,7 +604,7 @@ "name": "python", "nbconvert_exporter": "python", "pygments_lexer": "ipython3", - "version": "3.8.5" + "version": "3.10.6" }, "pycharm": { "stem_cell": { From 20e3c0a0180f63c4ee1a8b0b987bfc5c6a35b233 Mon Sep 17 00:00:00 2001 From: Tianpu Zhao Date: Wed, 19 Apr 2023 18:19:53 -0500 Subject: [PATCH 4/9] Minor fix --- examples/demo_zeropi.ipynb | 2 +- 1 file changed, 1 insertion(+), 1 deletion(-) diff --git a/examples/demo_zeropi.ipynb b/examples/demo_zeropi.ipynb index 483a514..bee9867 100644 --- a/examples/demo_zeropi.ipynb +++ b/examples/demo_zeropi.ipynb @@ -55,7 +55,7 @@ "cell_type": "markdown", "metadata": {}, "source": [ - "Neglecting ground capacitances, the $0$-$\\pi$ circuit has a pair of capacitors, a pair of linear inductors and a pair of Josephson junctions. The circuit has three modes: a transmon-like $\\theta$-mode, a fluxonium-like $\\phi$-mode and a spurious harmonic oscillator $\\zeta$-mode. When the capacitor pairs and the linear inductor pairs are identical, the $\\zeta$-mode is decoupled from the rest two. The Hamiltonian for the $0$-$\\pi$ circuit decoupled from the $\\zeta$-mode is\n", + "The $0$-$\\pi$ circuit has a pair of capacitors, a pair of linear inductors and a pair of Josephson junctions. The circuit has three modes: a transmon-like $\\theta$-mode, a fluxonium-like $\\phi$-mode and a spurious harmonic oscillator $\\zeta$-mode. When the capacitor pairs and the linear inductor pairs are identical, the $\\zeta$-mode is decoupled from the rest two. The Hamiltonian for the $0$-$\\pi$ circuit decoupled from the $\\zeta$-mode is\n", "\\begin{align*}\n", "H_{\\phi,\\theta}&=-2E_\\text{CJ}\\partial_\\phi^2+2E_{\\text{C}\\Sigma}(i\\partial_\\theta-n_g)^2-2E_\\text{J}\\cos\\theta\\cos(\\phi-\\varphi_\\text{ext}/2)+E_L\\phi^2+2E_\\text{J} \\\\\n", "&+2E_{C\\Sigma}dC_J\\,\\partial_\\phi\\partial_\\theta + E_J dE_J \\sin\\theta\\sin(\\phi-\\phi_\\text{ext}/2),\n", From 000dd91b1f8316a010364b4689560396c425cc47 Mon Sep 17 00:00:00 2001 From: Joseph Yaker Date: Thu, 20 Apr 2023 16:18:35 -0500 Subject: [PATCH 5/9] changed omega_q, omega_r to frequency_q, frequency_r --- examples/demo-jaynes-cummings.ipynb | 74 +++++++++++++++++++++-------- 1 file changed, 55 insertions(+), 19 deletions(-) diff --git a/examples/demo-jaynes-cummings.ipynb b/examples/demo-jaynes-cummings.ipynb index 0af9b90..5d377f3 100644 --- a/examples/demo-jaynes-cummings.ipynb +++ b/examples/demo-jaynes-cummings.ipynb @@ -2,7 +2,11 @@ "cells": [ { "cell_type": "markdown", - "metadata": {}, + "metadata": { + "pycharm": { + "name": "#%% md\n" + } + }, "source": [ "# scqubits example: Jaynes-Cummings model\n", "J. Koch and P. Groszkowski\n", @@ -22,7 +26,7 @@ }, "init_cell": true, "pycharm": { - "is_executing": false + "name": "#%%\n" }, "scrolled": true }, @@ -39,7 +43,11 @@ }, { "cell_type": "markdown", - "metadata": {}, + "metadata": { + "pycharm": { + "name": "#%% md\n" + } + }, "source": [ "## The Jaynes-Cummings model\n", "\n", @@ -59,18 +67,22 @@ { "cell_type": "code", "execution_count": 2, - "metadata": {}, + "metadata": { + "pycharm": { + "name": "#%%\n" + } + }, "outputs": [], "source": [ "# exact eigenenergies for comparing with numerics\n", "\n", - "def energies(omega_r, omega_q, g, n_cutoff):\n", - " delta = omega_r - omega_q\n", - " energies1 = (np.arange(1, n_cutoff) - 0.5) * omega_r\n", + "def energies(frequency_r, frequency_q, g, n_cutoff):\n", + " delta = frequency_r - frequency_q\n", + " energies1 = (np.arange(1, n_cutoff) - 0.5) * frequency_r\n", " energies2 = np.sqrt(delta**2/4 + np.arange(1, n_cutoff) * g**2)\n", " energies_plus = energies1 + energies2\n", " energies_minus = energies1 - energies2\n", - " energies_0 = np.asarray([[-0.5 * omega_q]])\n", + " energies_0 = np.asarray([[-0.5 * frequency_q]])\n", " all_energies = np.append(energies_0, energies_minus)\n", " all_energies = np.append(all_energies, energies_plus)\n", " return np.sort(all_energies)" @@ -78,7 +90,11 @@ }, { "cell_type": "markdown", - "metadata": {}, + "metadata": { + "pycharm": { + "name": "#%% md\n" + } + }, "source": [ "### Set up the subsystems" ] @@ -97,15 +113,15 @@ }, "outputs": [], "source": [ - "omega_q = 1.0\n", - "omega_r = 0.8\n", + "frequency_q = 1.0\n", + "frequency_r = 0.8\n", "g = 0.1\n", "\n", "\n", - "qubit = scq.GenericQubit(E=omega_q)\n", + "qubit = scq.GenericQubit(E=frequency_q)\n", "\n", "osc = scq.Oscillator(\n", - " E_osc=omega_r,\n", + " E_osc=frequency_r,\n", " truncated_dim=10 # up to 9 photons\n", ")" ] @@ -153,6 +169,9 @@ "ExecuteTime": { "end_time": "2020-03-31T11:43:54.772581Z", "start_time": "2020-03-31T11:43:54.765597Z" + }, + "pycharm": { + "name": "#%%\n" } }, "outputs": [ @@ -201,6 +220,9 @@ "ExecuteTime": { "end_time": "2020-03-31T11:44:06.327709Z", "start_time": "2020-03-31T11:44:06.314743Z" + }, + "pycharm": { + "name": "#%%\n" } }, "outputs": [ @@ -220,13 +242,15 @@ { "cell_type": "code", "execution_count": 7, - "metadata": {}, + "metadata": { + "pycharm": { + "name": "#%%\n" + } + }, "outputs": [ { "data": { - "text/plain": [ - "array([-0.5 , 0.25857864, 0.54142136, 1.02679492, 1.37320508])" - ] + "text/plain": "array([-0.5 , 0.25857864, 0.54142136, 1.02679492, 1.37320508])" }, "execution_count": 7, "metadata": {}, @@ -234,8 +258,20 @@ } ], "source": [ - "energies(omega_r, omega_q, g, 3)" + "energies(frequency_r, frequency_q, g, 3)" ] + }, + { + "cell_type": "code", + "execution_count": null, + "outputs": [], + "source": [], + "metadata": { + "collapsed": false, + "pycharm": { + "name": "#%%\n" + } + } } ], "metadata": { @@ -309,4 +345,4 @@ }, "nbformat": 4, "nbformat_minor": 4 -} +} \ No newline at end of file From 55e10e9a4ae1b96a4671efa2c6e027f91343b56c Mon Sep 17 00:00:00 2001 From: yunweilu Date: Mon, 24 Apr 2023 13:13:20 -0500 Subject: [PATCH 6/9] update --- examples/demo_cos2phi_qubit.ipynb | 12967 +--------------------------- 1 file changed, 26 insertions(+), 12941 deletions(-) diff --git a/examples/demo_cos2phi_qubit.ipynb b/examples/demo_cos2phi_qubit.ipynb index fec772e..48fa774 100644 --- a/examples/demo_cos2phi_qubit.ipynb +++ b/examples/demo_cos2phi_qubit.ipynb @@ -14,7 +14,7 @@ }, { "cell_type": "code", - "execution_count": 1, + "execution_count": null, "metadata": { "ExecuteTime": { "end_time": "2021-03-11T02:42:35.772716Z", @@ -23,9 +23,6 @@ }, "outputs": [], "source": [ - "%matplotlib inline\n", - "%config InlineBackend.figure_format = 'svg'\n", - "\n", "import numpy as np\n", "import scqubits as scq" ] @@ -66,43 +63,14 @@ }, { "cell_type": "code", - "execution_count": 2, + "execution_count": null, "metadata": { "ExecuteTime": { "end_time": "2021-03-11T02:42:35.969228Z", "start_time": "2021-03-11T02:42:35.775838Z" } }, - "outputs": [ - { - "data": { - "application/vnd.jupyter.widget-view+json": { - "model_id": "ac018e81e14f425ca7b0b15c6f0eed1b", - "version_major": 2, - "version_minor": 0 - }, - "text/plain": [ - "HBox(children=(VBox(children=(HBox(children=(Label(value='EJ [GHz]'), FloatText(value=15.0, layout=Layout(widt…" - ] - }, - "metadata": {}, - "output_type": "display_data" - }, - { - "data": { - "application/vnd.jupyter.widget-view+json": { - "model_id": "b87a86e2c9c44a2faa89b0b8c3dd1ebc", - "version_major": 2, - "version_minor": 0 - }, - "text/plain": [ - "Output()" - ] - }, - "metadata": {}, - "output_type": "display_data" - } - ], + "outputs": [], "source": [ "cos2phi_qubit = scq.Cos2PhiQubit.create()" ] @@ -113,19 +81,19 @@ "source": [ "From figure above, we can see that cos2phi can be viewed as a $0-\\pi$ qubit with maximum disorder in shunt capacitors.\n", "\n", - "Benifits of cos2phi qubit: When biased at half flux quantum, it is protected from dielectric loss, charge noise and flux noise. However, it suffers from inductive, see https://bpb-us-e1.wpmucdn.com/sites.northwestern.edu/dist/2/1168/files/2022/01/Xinyuan-You-2021.pdf page 80 for more details." + "Benifits of cos2phi qubit: When biased at half flux quantum, it is protected from dielectric loss, charge noise and flux noise. However, it suffers from inductive loss, see https://bpb-us-e1.wpmucdn.com/sites.northwestern.edu/dist/2/1168/files/2022/01/Xinyuan-You-2021.pdf page 80 for more details." ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - "Alternativley, the qubit instance can be crated with:" + "Alternatively, the qubit instance can be crated with:" ] }, { "cell_type": "code", - "execution_count": 3, + "execution_count": null, "metadata": { "ExecuteTime": { "end_time": "2021-03-11T02:42:35.974074Z", @@ -139,48 +107,25 @@ " EL = 1.0,\n", " EC = 0.04,\n", " dCJ = 0.0,\n", - " dL = 0.6,\n", + " dL = 0.0,\n", " dEJ = 0.0,\n", " flux = 0.5,\n", " ng = 0.0,\n", - " ncut = 7,\n", - " phi_cut = 7,\n", + " ncut = 10,\n", + " phi_cut = 10,\n", " zeta_cut = 30)" ] }, { "cell_type": "code", - "execution_count": 4, + "execution_count": null, "metadata": { "ExecuteTime": { "end_time": "2021-03-11T02:42:35.978143Z", "start_time": "2021-03-11T02:42:35.976060Z" } }, - "outputs": [ - { - "name": "stdout", - "output_type": "stream", - "text": [ - "Cos2PhiQubit--------| [Cos2PhiQubit_2]\n", - " | EJ: 15.0\n", - " | ECJ: 2.0\n", - " | EL: 1.0\n", - " | EC: 0.04\n", - " | dCJ: 0.0\n", - " | dL: 0.6\n", - " | dEJ: 0.0\n", - " | flux: 0.5\n", - " | ng: 0.0\n", - " | ncut: 7\n", - " | zeta_cut: 30\n", - " | phi_cut: 7\n", - " |\n", - " | dim: 3150\n", - "\n" - ] - } - ], + "outputs": [], "source": [ "print(cos2phi_qubit)" ] @@ -195,4276 +140,14 @@ }, { "cell_type": "code", - "execution_count": 5, + "execution_count": null, "metadata": { "ExecuteTime": { "end_time": "2021-03-11T02:42:36.374414Z", "start_time": "2021-03-11T02:42:35.979646Z" } }, - "outputs": [ - { - "data": { - "image/svg+xml": [ - "\r\n", - "\r\n", - "\r\n", - "\r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " 2021-07-18T11:02:48.317707\r\n", - " image/svg+xml\r\n", - " \r\n", - " \r\n", - " Matplotlib v3.3.4, https://matplotlib.org/\r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - " \r\n", - 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" - ] - }, - "metadata": { - "needs_background": "light" - }, - "output_type": "display_data" - } - ], + "outputs": [], "source": [ "cos2phi_qubit.plot_matrixelements('n_phi_operator', evals_count=10);" ] @@ -13161,22 +261,7 @@ "start_time": "2021-03-11T02:42:34.385Z" } }, - "outputs": [ - { - "data": { - "application/vnd.jupyter.widget-view+json": { - "model_id": "e632a0d9a7e448baa09de125382b83b8", - "version_major": 2, - "version_minor": 0 - }, - "text/plain": [ - "HBox(children=(HTML(value='Spectral data'), FloatProgress(value=0.0, max=101.0), HTML(value='')))" - ] - }, - "metadata": {}, - "output_type": "display_data" - } - ], + "outputs": [], "source": [ "flux_list = np.linspace(0.4, 0.6, 101)\n", "fig, ax = cos2phi_qubit.plot_matelem_vs_paramvals('n_phi_operator', 'flux', flux_list, select_elems=4);" From 406087358ef1c0201b368c23be162e009b1daaf4 Mon Sep 17 00:00:00 2001 From: Tianpu Zhao Date: Mon, 24 Apr 2023 14:11:21 -0500 Subject: [PATCH 7/9] Fixed typos; attempted to improve the explanation on how the full zero-pi is diagonalizaed; attempted to clarify disorder-related descriptions. --- examples/demo_zeropi.ipynb | 248 +++++++++++++++++++++++-------------- 1 file changed, 158 insertions(+), 90 deletions(-) diff --git a/examples/demo_zeropi.ipynb b/examples/demo_zeropi.ipynb index bee9867..6d90425 100644 --- a/examples/demo_zeropi.ipynb +++ b/examples/demo_zeropi.ipynb @@ -21,7 +21,7 @@ }, { "cell_type": "code", - "execution_count": 1, + "execution_count": 20, "metadata": { "ExecuteTime": { "end_time": "2020-03-27T13:04:04.721293Z", @@ -35,9 +35,6 @@ }, "outputs": [], "source": [ - "%matplotlib inline\n", - "%config InlineBackend.figure_format = 'svg'\n", - "\n", "import numpy as np\n", "import scqubits as scq" ] @@ -55,12 +52,12 @@ "cell_type": "markdown", "metadata": {}, "source": [ - "The $0$-$\\pi$ circuit has a pair of capacitors, a pair of linear inductors and a pair of Josephson junctions. The circuit has three modes: a transmon-like $\\theta$-mode, a fluxonium-like $\\phi$-mode and a spurious harmonic oscillator $\\zeta$-mode. When the capacitor pairs and the linear inductor pairs are identical, the $\\zeta$-mode is decoupled from the rest two. The Hamiltonian for the $0$-$\\pi$ circuit decoupled from the $\\zeta$-mode is\n", + "The ideal $0$-$\\pi$ circuit has an identical pair of capacitors, an identical pair of linear inductors and an identical pair of Josephson junctions (including paracitic capacitances). The circuit has three modes: a transmon-like $\\theta$-mode, a fluxonium-like $\\phi$-mode and a spurious harmonic oscillator $\\zeta$-mode. When is no disorder (asymmetry) in the capacitor pairs or the inductor pairs, the $\\zeta$-mode is decoupled from the rest two. When the small disorder in the junction capacitances and junction energies are taken into account in first order, the Hamiltonian for the $0$-$\\pi$ circuit decoupled from the $\\zeta$-mode is\n", "\\begin{align*}\n", "H_{\\phi,\\theta}&=-2E_\\text{CJ}\\partial_\\phi^2+2E_{\\text{C}\\Sigma}(i\\partial_\\theta-n_g)^2-2E_\\text{J}\\cos\\theta\\cos(\\phi-\\varphi_\\text{ext}/2)+E_L\\phi^2+2E_\\text{J} \\\\\n", "&+2E_{C\\Sigma}dC_J\\,\\partial_\\phi\\partial_\\theta + E_J dE_J \\sin\\theta\\sin(\\phi-\\phi_\\text{ext}/2),\n", "\\end{align*}\n", - "where $\\varphi_{\\text{ext}} = 2\\pi\\Phi_{\\text{ext}}/\\Phi_0$ is the reduced external magnetic flux, $dC_J = 2(C_{J1} - C_{J2})/(C_{J1}+C_{J2})$ and $dE_J = 2(E_{J1} - E_{J2})/(E_{J1}+E_{J2})$\n", + "where $\\varphi_{\\text{ext}} = 2\\pi\\Phi_{\\text{ext}}/\\Phi_0$ is the reduced external magnetic flux, the diorder of parasitic capacitances and junction energies are defined as $dC_J = 2(C_{J1} - C_{J2})/(C_{J1}+C_{J2})$ and $dE_J = 2(E_{J1} - E_{J2})/(E_{J1}+E_{J2})$.\n", "\n", "
\n", "\n", @@ -69,7 +66,7 @@ }, { "cell_type": "code", - "execution_count": 2, + "execution_count": 21, "metadata": { "ExecuteTime": { "end_time": "2020-03-27T13:04:05.513875Z", @@ -80,7 +77,7 @@ { "data": { "application/vnd.jupyter.widget-view+json": { - "model_id": "0471c36104f54d4bad4f52253e947e63", + "model_id": "272ebf4df0a5423f8dc35aaafc756be9", "version_major": 2, "version_minor": 0 }, @@ -94,7 +91,7 @@ { "data": { "application/vnd.jupyter.widget-view+json": { - "model_id": "bc5689a964a7472483b8481718a7d69d", + "model_id": "c01e02e4e1234a458314feff3780aaae", "version_major": 2, "version_minor": 0 }, @@ -117,12 +114,12 @@ "source": [ "**Programmatic creation**\n", "\n", - "Diagonlization of $0$-$\\pi$ proceeds in a hybrid basis, using charge basis for $\\theta$ and discretization over an interval for $\\phi$. (The latter explains the need for providing grid parameters.)" + "The diagonlization of $0$-$\\pi$ proceeds in a hybrid basis, using the charge basis for $\\theta$ and discretization over an interval for $\\phi$. (The latter explains the need for providing grid parameters.)" ] }, { "cell_type": "code", - "execution_count": 4, + "execution_count": 22, "metadata": { "ExecuteTime": { "end_time": "2020-03-27T12:55:37.604003Z", @@ -132,7 +129,7 @@ "outputs": [], "source": [ "zero_pi = scq.ZeroPi(\n", - " # reminder: the parameters for generating an 1D grid are (min_value, max_value, num_grid_points)\n", + " # reminder: the parameters for generating a 1D grid are (min_value, max_value, num_grid_points)\n", " grid = scq.Grid1d(-6*np.pi, 6*np.pi, 200), \n", " EJ = 10.0,\n", " EL = 0.04,\n", @@ -146,14 +143,14 @@ }, { "cell_type": "code", - "execution_count": 5, + "execution_count": 23, "metadata": {}, "outputs": [ { "name": "stdout", "output_type": "stream", "text": [ - "ZeroPi--------------| [ZeroPi_3]\n", + "ZeroPi--------------| [ZeroPi_4]\n", " | EJ: 10.0\n", " | EL: 0.04\n", " | ECJ: 20.0\n", @@ -179,12 +176,12 @@ "cell_type": "markdown", "metadata": {}, "source": [ - "Just like other qubits implemented in scqubits, parameters of $0$-$\\pi$ can be modified by either assiging values to the corresponding attributes, or through modifying values in the above GUI." + "Just like other qubits implemented in scqubits, parameters of $0$-$\\pi$ can be modified by either assigning values to the corresponding attributes, or through modifying values in the above GUI." ] }, { "cell_type": "code", - "execution_count": 11, + "execution_count": 24, "metadata": {}, "outputs": [], "source": [ @@ -196,27 +193,27 @@ "cell_type": "markdown", "metadata": {}, "source": [ - "An interesting alternative way to specify capacitive energies is to provide $E_{CJ}$ and $E_{C\\Sigma}$ (corresponds to the optional argument `ECS`) during the initialization. The $E_C$ value can also be changed by providing $E_{C\\Sigma}$ value in the following way:" + "An interesting alternative way to specify capacitive energies is to provide $E_{CJ}$ and $E_{C\\Sigma}$ (the latter corresponds to the optional argument `ECS`) during the initialization. The $E_C$ value can also be changed by providing an $E_{C\\Sigma}$ value in the following way:" ] }, { "cell_type": "code", - "execution_count": 10, + "execution_count": 26, "metadata": {}, "outputs": [ { "data": { "text/plain": [ - "0.4081632653061224" + "0.04008016032064128" ] }, - "execution_count": 10, + "execution_count": 26, "metadata": {}, "output_type": "execute_result" } ], "source": [ - "zero_pi.set_EC_via_ECS(0.4)\n", + "zero_pi.set_EC_via_ECS(0.04)\n", "zero_pi.EC" ] }, @@ -232,12 +229,12 @@ "cell_type": "markdown", "metadata": {}, "source": [ - "**Eigenenergies.** Similar to other qubits, eigenvalue computations and parameter sweeps can be performed using following methods:" + "**Eigenenergies.** Similar to other qubits, eigenvalue computations and parameter sweeps can be performed using the following methods:" ] }, { "cell_type": "code", - "execution_count": 7, + "execution_count": 27, "metadata": { "ExecuteTime": { "end_time": "2020-02-07T03:18:47.984128Z", @@ -248,11 +245,11 @@ { "data": { "text/plain": [ - "array([17.0014342 , 17.02182808, 18.1214257 , 18.13868249, 18.72196777,\n", - " 18.93031195, 19.16309846, 19.17777943, 19.92663351, 20.0898962 ])" + "array([17.00199548, 17.02238769, 18.12303267, 18.14028472, 18.72257217,\n", + " 18.93090846, 19.16555977, 19.18024366, 19.92838159, 20.0925804 ])" ] }, - "execution_count": 7, + "execution_count": 27, "metadata": {}, "output_type": "execute_result" } @@ -263,7 +260,7 @@ }, { "cell_type": "code", - "execution_count": 16, + "execution_count": 28, "metadata": { "ExecuteTime": { "end_time": "2020-02-07T03:19:42.994539Z", @@ -274,7 +271,7 @@ { "data": { "application/vnd.jupyter.widget-view+json": { - "model_id": "616668afb5f3409dbe28394570e7fea6", + "model_id": "91df4bdf1cd94dc683bced2cd0995a1b", "version_major": 2, "version_minor": 0 }, @@ -287,8 +284,19 @@ }, { "data": { - "application/pdf": 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" ] @@ -301,7 +309,7 @@ ], "source": [ "flux_list = np.linspace(0, 1, 27)\n", - "zero_pi.plot_evals_vs_paramvals('flux', flux_list, evals_count=8);" + "zero_pi.plot_evals_vs_paramvals(param_name='flux', param_vals=flux_list, evals_count=8)" ] }, { @@ -314,44 +322,54 @@ }, { "cell_type": "code", - "execution_count": 13, + "execution_count": 29, "metadata": {}, "outputs": [ { "data": { "text/plain": [ - "array([[-0.05922139, 0.00525573, -0.00173534, -0.00314021, -0.06151892,\n", - " -0.05125716],\n", - " [ 0.00525573, -0.15354172, 0.00527505, -0.0056875 , 1.05065762,\n", - " 0.00665317],\n", - " [-0.00173534, 0.00527505, -0.08639363, -0.02892699, -0.02009053,\n", - " 0.01284532],\n", - " [-0.00314021, -0.0056875 , -0.02892699, -0.1198874 , 0.01334359,\n", - " 0.00595058],\n", - " [-0.06151892, 1.05065762, -0.02009053, 0.01334359, 0.13307501,\n", - " 0.03973421],\n", - " [-0.05125716, 0.00665317, 0.01284532, 0.00595058, 0.03973421,\n", - " -0.11209945]])" + "array([[-9.99999988e-02, -9.08155057e-06, -1.87089570e+00,\n", + " -7.30546369e-03, 4.15189011e-06, 2.86984696e-08],\n", + " [-9.08155057e-06, -1.00000001e-01, -7.32661152e-03,\n", + " 1.86834885e+00, -4.92300440e-09, -9.44249251e-06],\n", + " [-1.87089570e+00, -7.32661152e-03, -9.99969195e-02,\n", + " -4.23068292e-04, -1.11223943e-05, -8.48295183e-02],\n", + " [-7.30546369e-03, 1.86834885e+00, -4.23068292e-04,\n", + " -1.00003433e-01, -2.67073860e-02, -8.42335338e-04],\n", + " [ 4.15189011e-06, -4.92300441e-09, -1.11223943e-05,\n", + " -2.67073860e-02, -9.99999966e-02, 7.37293731e-07],\n", + " [ 2.86984696e-08, -9.44249251e-06, -8.48295183e-02,\n", + " -8.42335338e-04, 7.37293731e-07, -9.99999360e-02]])" ] }, - "execution_count": 13, + "execution_count": 29, "metadata": {}, "output_type": "execute_result" } ], "source": [ - "zero_pi.matrixelement_table(operator=\"n_theta_operator\",)" + "zero_pi.matrixelement_table(operator=\"n_theta_operator\")" ] }, { "cell_type": "code", - "execution_count": 14, + "execution_count": 30, "metadata": {}, "outputs": [ { "data": { - "application/pdf": 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o8jm9D3y4fBy8m6h2BO+JkUEzalfNXXz/u+AfNHa/wtDBb8z4LiZyMIYN5iaICKpVhnhs4t+Bh0r8Xx7D74+q/HC8ip4wDC5cFStORxSO9iOSt8FsGcFnTkGAo4ovD3QvG6g4/uZAcnPkdhq5awoYUtAfnKMm3Z0OTvg6bu+JhZpCf3RW+s5UAjAx9VgZnBx9SMLFpMsJ5+mVojiKdUw5PPuBXacwB14G2wU7cWGoJtTUI6PcOuX2yO008sXmdDabuxTm0i2FlcRgLR5WPfBJEq252UvhT629x5duzlKg+IUHd+I18uhWdyee82xkCqPC/9WghLs97d38Hbpir71vmmzgX0humdZQeyWlik3SmPQQy1wKd2pNWF0KiNRxMF1xwBsPz5mYdfMMig8rNgwtVBVvczq7zfsg8/uXOhPUlCaHpyQfofPQWo4RTVvo7017Ly9ktp6K2zrrfY/5+d+jKfbS+ybVhP03k4+pmjM2RYoJu5WGbL9JACkh9bvJt0Zup5EQvHM2aY0odw2SBctz8cjEWay6yjEnDw9/0ee9c7ZUUzrB6Rd5DeP6fV+IAmv3ZH9KZGB8DFEO7OdemTIgmgHgmjzX3AU3R26nkRoFKbExXUhSLgIolM545XF0FP3BAhXVCAiLndk08plLBurL48nsVtG2wcw9niB8j37bGutbUxvy34hKgI+dM+0NMzQldSuppKnoOfJBVKyR22nkJik/CfPKs53IdOgxNGOltisTZySvt0LDmxwauApk6dtSBbfk28Xmacs+sUyTGK8U3PmehQSLzjk0Nk1RFbGuQrBiumLNGMDl0ucA1JMZjzwBBXIr1LRZNJorzn+eZXfyYarq29bcmIzVArPc9swlmBE5ysPzMvgOZc5Q6Dlf/Yoj1UI2FJkT3DIT5SM5fIx6KmZ+kS+hPc8PK8vTrcjsQjL5CDWbUbQuMv159HyX3B65nUZSJUkXY0hJVJKH93qcW3h82oLakMqsUHVKmAXbpsQomeBY9DhPX9MibQVUGJSrxOfozayl7orGJCsqmuylPgdgFih530vWyO00cpOktQzQZeyOUzvL1M3EK0STKX0yhYPHbLKZ8DzXKtRZVA+yi+SDVw0CzzfFQKYhuRiH4IW571gR2dozzNGiwm4CQM5R7hNuD9yeB2qgD7rDo2WqL8Cy5yNZifhM40xIA6/S6zTOOpjL9sAqmN/Xgiw/b6hUkLJILab+4vnsB42zR26nkS8w1wZRzwjLa+DXDM2949WG+hC5SZFLv08jwK10EJsi9hdEJFGT58E/zZHbaeTm/OLthYQO6joovXBvmjqx60qeXcLZECq3+nJv2iq0cGs28heYlShyg9h0zaTgc5AGZvAmub3QRn+1NZ2t/EYs8LNzR2eQA3wkOKrgOLPNIvP9DmJhjdxOI8lAObOBB9zcnQGsI/dD8ndf5Etog9O3bE9nv7mcw6ZQC91D/EqGWrW5KwVzvI/TPYMquEbfIQkL+bNn9B0j7n+RNQNrgQWIUOvICiwZbqWGnTBxYH085dcsq9iKns1kSbnbmf+IXN0j7DQGb//JuRr8zGerj6f4SiHNgQmPvPiUVJN5gZNZ7bvk5sjtNHKTpPfCa3xT0+ThJQXRloE5bMzSki/CP3T1bfm884aHbES6wgot8h4mcsvaYbLwGd+jLc7qu6TXoZS75EAE2sQmUJfBMbG2zBoTX6SJzu3a4ozcTiM32zG9+W4s/gV4B9xkLmHqs9exu7cldUnUGJ3pb08nk59PtBKhPGXmQTE/KGW9Q8DrG/R4iipQHHsU3lN9c6ss3ZymhCp5Yj6uwgcezzRebU7ni+42qM3aoUhNDST/bYhwQH/sjNzuUG6P3E4jX3Bbh6x6ToO8By+S3DBea5r1OUQZMjeDYMUovfbE/GpaliDXWmq52yBr5HYauZv9SfgSFR+gNZrvYPsGLl9x+M1d8JJLCBrewDbpU9GBNLRDyLcJtwduzwM3e55uL6bV4Yc2nVwI4iMwgTIyG5U5hqM1jcHL85xSk+c1SPbuCxB3QP8NxElRFZoDpq3WyCuDhGasD0C0pTuIWyO308gX/NDhe64CWfq2FMONSKTGJ0MoktqMuWQScikvMdyE/F3syroF4KBFotcjp5GZcEq0a5jSMQ5Hwh64nQbuZ+6zCqfl7TpYWk3QYH4jcKh2XQVWThDTwwRAvJsKHpmmXFvV+F/m+UffTW+LBLDvQUIb2TyHzokJfIN+OwrrenSOv7QwtMpDDLCimkVyXr6IGoFjihcoUhdJSo5d040C73tPKQFBDM8Mg+6HHjVmesD7jq1P4SCCGLZVVIgD4cBIAcMO/2aEfI9l2yO308hNqjeAv/DqNpUcyExjcnNA0gc9mxk/TXkj/RAXGKYrZ7lii/+mYXfXwQPm+5QbI7fTSD11b7xuGxWugT9Fs5Aq53MotW49NGVYfExXVnkkkKYdpwdwDqOcHjSiZXvEcKAT7EjWmAOvUuILNcuhJt4dbfd4kD1yO408Jnxw2TjhudQh+ceeS+BbH9taLTz2oH6MkoXTshwF9iOZ4ZzUd15WJtXtvM7edhU3Vd/cKis3pymgyI0lH3J7lpWC9guv7tZ0vucudy089FSCnQhzrcmEwz+Flsqdpl1uc+R2Gkk4rIwL1l5VcBhU3ZuNufalRIX3GXrVC+R83lOpU4luHmk/aOJNDPDPpk4EmHDPaw2Q4/043oznyPM1MAHY84KGDIXmshZUSD2YDNXU5oNla6GdTAwsvIUReXud17NegIoNQcuIuDlNtxfT6rhsjot3yI1fwHwUiRTyZj6YD2tPMQAPPzgLAKng9sjtNPKF9XGsiQ+SFqi+KcqYvI6SxRNjDISFmEbUgOcATJQj4OmM3E4jX5y528foXviBrwnwvQk2LBEFP7w8Z9kBdqrOciiFFR66RMexZInJGPUNxa2R22mkhlNYUYant6Ex/7yPXcHfK76ryrbxXQqGLV45UuWL8ANq3rMz4AhAs5XqYoZzf4WFDnZ+PRY62ObGWZzI0TdsTmez+f6zTSW/Y3Pau811RM0EmjsZ7/AqJiuuUHPbYJEpSTpOLHgXGWrdubg5cHseqPlHFY5i1p0JVobVOFT8rPm+Jtus4emIs9ekMZTAOltVlJOl5xLd2lEejjiNkdtp5A4prG7XBSRYaqWUPRnT4Nau0TRN7EJEqcw6Yrq58FmMqZpVwupLMTDdjBM4mHimAaxOVSr7GRdTkZS98D3wNasuRCxyZXrpaZvDxD1q7XiVfA0vvoqCS/mt+JjIs+Iw3PzFmy+gTcUd5n6XO4FZFpamI9kblbZQchoTHN8yeO99F9scuD0P3Dcm2FbUHVVpBTX3wObVvu2xbdURd2PlIwIaxWGhTEo3p8gd4MrPdLhszsjtNHLbWE9RdpLcxk6YSg0sz0TrnZoWxITCDo2ITx7QY5bjrsmpySWoRKLQePiu5AByp2cNx35pRcTBChXeHZxJFYV1vWAY7xpujdxOI32W4tAOF2ksYFobW+ad3CFB7sASAvhnjWCNa2OVpCYqxHPwPfeAzwtTP/i8YO/sNpNp1blIjTAQhSo1PhfGOnkJHi4R638FOdaLegxONYAhJevg91Dp9NCYx4BNjsG5ECMWvdKVpHqa3KuHpvCa8OhrUZxlXkobUSXkDXcp4CDPufN0xiv+ag/4OCjuoP43oLgDyw7qOeGXu9yFRy5KU+EXlA66pyCe6TxVFmjd5TZHbqeRL3iKQzxcmDRh9TtQxYEJ1+m3XaWFqNJh11kYuCiOD3KN2/64BB7vsNgGP/YlqDggtIzQSsnAoCCWiWcsZHpztqy/BW2i9j0qbqus74Wa1H1h7hukhTqylIv8I9zKxujyZK3DUIMeZWH9pmg4HtPa76lCwCpsmIsmeRB8BSNZoXT0sZiLsx5LpQ8tqgwCOPayTlJaLilRgbtd9joOeBxhXPQIjmXW4nEvHeYHJkw1nFdUHr37T2eGouFwcJvIl4HJbe4p9ZZL4Bsf21itPPdJUpOA6RmB+T1jaLFMC2p86LD5ztrzkySFbYsKzrTZrlEJmzH5YGiD57q9OSOniul3PEkIswpPYZl91riPGmDDLIjL5uxMZx/fhc5QWinPzEnkNMEXkdQwIl8trHm+C22O3E4jNZl2FCBAUrFLH1Lgn0XNeoCsURaetTV1B8rzIuV1GBwCcIzjqBZ2oncFpsTKsU9XRD8/mZb1GVlydWoZSM13sxbBnVYbTZfiIG8yS5Ie68CnRpE0MRKCha4GEACHP3oFgzZqLrSXnqV3LLeLjyaevnnIMwkDDnJdDpSD9+EkdgU3B9us5129nYHb88BNytWnCZpRREeoQFLrGbrBPT20XlmZmASp3kdWAj0ZqtyJlTWlXh2vojPnZu4Vnfdqfytjsw58O3jsoqOJpksBpWJCBzs8aB1thm7VZPJ5n3HKnONDtQ6hCygOAC0js5nVuVkhTGtJMqvtvjdPO9bdgTbN+Z6dae803222Ofsx3Tyga43BaGHOLcGJ6tx9PECIbEWwG3pn5HYauTnB+tuLozQna8wJ7q8z9Kw0yfqKWed8so2LeA8zsO9L3b0KFpXUkuaTFfHDfio+2IZFwIZupvRVIUYCO8dzRs2nu5ns7sAeR+J/sd4tNoCU+ZeCn1m/R7JRgiSw7c/xffp8AMQp4f4e2SmZm6Y95iwz7shjrynZ1XILHBglQA3NZf3QfqQX2iO308jNiU/e3HgmWyjxiJQLwUqloH5SnYDV8Qdmg2jYJJYS5jfBuA3LvsdvsvaFPIXXRoHcMYuA2IRalpKYwYYoScvhwoLGoB4ldiTnRF37yEpn9TjtxNbMyrBY5Lc/XoT4dIeNKN6LmMcqzKDda7UbfqNPsGxCtjBHHGjQ+K9ZAq4F+KcVoBxX3fMfbG/jbjRhVVrISU788GoWqq6ChSwBQ3Q+WLg9cjuN3CT5FSokSbH4hJmlAOjNoQG+Wbf9kLvk2Grsx8KbcDxs7ky9HTqplYfx+X524ozcTiM3J2335qf54jkmNkpbMtkFu+rjPZPn9mw70FkCY/RHNh7YqKYwEsmZJCVgNp4gXoOCgrgeumKP3E4j9zlnQY6d1cL71VL/jg/mUyybki1MADZ9Ns8N83Tf3itrb4ODWMRco3aqy+xhFPd7YSAcnSHxKO6q+pWmwffowUKDr/VZWP6fnFYgXrrByHMgW9fnLNPw0uA7BGGdxbdPMG/SfQY7PLI4DpPAm7Tf8S2+xxAOybmLGtvYCQaCcjeip5h4Fl/nhbtdcnvkdhq5Ob7i7YVvyeM1NlZi8DAfHRn5GvxG41KwzwxLuy8+aAtSj0dOd1hLnwLK5mThZGnPIGuPP1Hw8Cy+wxAWukCe5+Y4Yy4ZsLjD0gjWrFJZjMosXY/4dweqvEMbH0Bsf2Sp7TSvyOxXZxJLpUtLLJAfpXuu7XRs7ddbINuieMFbM8j4FlPBfh6pHtSJJQzlXBPLBZ4aerqbH3PkdhqpLXIja+orjkP3u2q4dAIpcj8Gkggr02g+nsPDCar50CWeXP2i76mszyqKwhroT0WggPw19SrJeXhZi2yUJrQ2tM7ikrkfDpA5cjuNfEEPHbrnUhiT8izFcTNGqJ3UWpKuyuzMMdh8sb7AcQf2l4WxoKcjSue9yfCOdrswsd3Hatv7+x4MNzHZD5hbwbp1p2yAOtbCgAyc7cyuEPHOr868y+dRdmBm5SnbLnhp0u6abZSkupET2XF5ocMj1zFa0LyZ6TTKD7KemLR7ZXMUdpsuGk5hCyLKzcdj6NEgcShKHoe8o/Zd6FIrE8CXwndrQLiQmGhCOz9hZ+d+z4fV77KCWpgayvfA2wH77wBvG4z9EL8dC1gWBGKSD9Pi2v57QM5ylDgwglE+lbWp76Ep+ElgjUxxx2SwWLEgN1tIljrDcXRijdtO4/Yqw+BI0Ev2mGv5aALJxM4RqioP5rTt9ZuZqjI0e5/NYkLqR/FhOFZToDFJLY/2lCLx+aEr0FiGPGXZeTzFWMPl5ga4He/YdqXfCmFgw7IDtyw96Ci+q9DFJPKzKke8+zvmyO00cpPO9o3HHNo8DChfdgPPHLaZ9tgsaEHrGq+nJUwsIC6WnG2x1FODtgFD2GCLDh/Uq+WlIMiWx5HFzIndLWLdKbc8xSplPh1ZsrU9CHTwcuGpoBzeJOkvE6Q9e92LxkboSOY3i7ZW9qsXQ47nkG2odkdWA73n5o3cdM2AkX0sjlg5Pprnc/lKb22SlWcPHjdxuIZr+g2i8KjcvByEb7mwoxtd3RSk2C27CcLgYW3vym2N3E4j3ZR2L0XdOdLBu9lObJIKshsu2Nvic29p9S2XTUVRktQ5uOy908FZeFcJQhW2i9NDNGkaU/YJByOXncnXZDgpquBsDPjkoS1g3rbD4HgArgk1Te4D9a7YtbzLLZQDAJm1qEjkgVjLdEd25m0N3E4DmcDJrE2QJyh3v5LPxOPm9Hum5XMn27FeaXUYqASokxhxP0Et9CoV45dh7PLlCXtfXtkcx0btcg/WAwEaNJqZQZAYbChIOXlxJ0MZdofBGbmdRr4oluIUP/FORfieRn+IkSAWfJZ7ho+nJTzyZAMzrv8EmCUhIGyvFECW4tthiTFwOw3cFQUoIto9WKxIKy/ZgRCXe5tMfaG5jPVKKwdhoRisSaAF9Pg4CXMixOAf9XaMZywd4/r11tKzft75iRMA/XpjaVs/9/zE8fvXBSAmcQCOZiMMindRDip4Iogu6TNd6m+x8LbJ9o987EtuC0185n9feUUbkwa7FFVwPs7shKoYE6uc1HgG3uED92MGMH3YC1l5Rlxykiv5gV1cYZxKvrc6skdup5F+EqST1OidPCWAT2AtSticEq9AzP50sPP5QarJDHoBE57iTeZ8Xm5e+MZxdEyn6OvZlM2O/LM1M1z7VsuSzvheohJIwNahSU6i2M4WapmPXDx75HYauQmLxq5iTVlMdaR/UHdW8o6s+OzD9qi/hZU4LMM9n3JKvi2MCU7yJpZjFQvPojl69Mc8h1ySWhC2RJce2/IcIMUq29jDk1fbDnCsvJKnhJexvOdCaJ/eN61FBtajGER8XdcE9goFB1WvuvJ4VdvP/fCclRr0+B2Gq+t9GL4FbH6/1Ij1eKpJDONHH6PLXgR7433LKoV/MvSWV/6O5mPOyO000ncYHAfAJ4jv6eTS9Cp2cS6QZlwmL53DwreDCJ75oU/47OjLt9gc24a4h2pOov66CU8ZsJ0S61ZN9l5PI8zDxp9Nv2/M7WDA0hN582L2zb/IrTV7me/NRensFq8na4XXG/H3eM4ztFja4suvEGvyoqVMLRtN7bekI+281MmhzjLwrUlhBKApDifP8jH9epYpr0kMDXKFeLnz6Qjt87PwpME6Rkz+IDgNc8xuXoTS9dFsl26dp2N7DI4T4HAti5g9lj+Dtc57vUEsNEuWdz2IKoVF2lo8ThjMkdtppNITQPPuDkZMaRIwsQPvXtDEibGs0xDBEixL4TS1zFMgim1H+Fx3wXQu3rYjz9uOTVa4zyQExZKojU0aj734etimPjBP2Mt+ABV47ld3zMYmSyntKtqkyBwfw5wPcR8CPQaefv2ib6mB2s1jrB7Sc27m5zOpzroJcBBFGxO+VCv68XGiSzjlH/J+T8rhUQ7vWkikCvMWMgGBsw2xy1GcCM5BK6q8zHHQC7oek3KY19czKZMZOUfcTpj2LdXu03vPykVFVju+TKgzvCAtPGwtgj+pFvl9mGpY5xmnVqkAo4T1A6/nVEPKRBf37k2aI7fTSNct8/wsHxDfw+dSLmIWldHLI8ybw7JTVLZsn4cNNLmIw10Wppcw+xyqTu7XwF4zxZaHwAaBcTaW2e8OOzzE4S1fbtFNG+0cEpvxwoWJJY5X47gpLqUyCNgi0xi5wuzUS4ELw4PKQPAY6p0FChlGFJhwTaNtSdfNs+fMON6Jy0ze05iFJ3sDLK1hV2JVC7vIljIOc3628r7dNsMr3wHVJvQ6TNQJt61QaPi7THmil02oY78YPT+Vu7QMopH6B7BoPczjY3xeomDs8aUbUF4Cj1fWBADy1GsvggSBDPUp81qKtO6TnFxYK+Y5taPOtz1wex64OcGD24uAtZORa8calp1AUqFnoG+FqYayN73mbEfuXIJq0tmV9JS1pSvzW1g8A/sxKUSzMnpgR/kpl8rm3sYokxHo/dTJPP4Y7j0D8WVVyxLUIn0Cv8O02LbCO1C1w2sLq/VINnAT9lxkJus8mMczHfEJhhlHWVqpR4TGLkgUuuOxtgS0AzEeX7LZ1dfbRNPIuUd7ZjTwrh+ZTfn0OhaGwVltGizA5huzFHZa2/XDHLmdRtI1p8FJwj8KuTXQ5eAfZ1ri8gzTv39QEHx9b3r+BbCHgR4aLk214xcbXc9dQcyR22nkLjWv1YhWwyfk7N28CIHPmkyStfDWpNS/YIoDfUXgb9WKSNyEDdBHqdlEI4tp1KcxRn0s9Sx+ub8DKyvvmP0xRBZ4Payw+rLw/sbjwyZzHfHZ0NZwWHNn5HYauTlpv7cXacL04UR1WFygR6n2vKcPg/+ztm3nRQwpWrmIhPBeMoFscpJColXaK09VsauTMe26Nz+zKYhNWO6hSHibvWkKMz5femUKUucCtAUwHdEmZ+R2GrkHEkAyu16ZGUzwLHsRb+tEy43bOHGehRY9daZN8vYgVTLxfvNF69TTOcx7xhPUIL6y6DYBWBhucvwBm+C7rMrgYA9ST3Y269pkM4XQeCVUmCpAmZb0uD3mjNxOI/14kxlA8nXH0rWlYbLcWbKW3EImUnoj3GzVcXXBpI4PNb6INDMOPV/MLGUyg7QDADQR5g8i4ozcTiM3J3Po5uUG+3fF7USjhekLXlVmp8qydzgXmcoDy56Y1hDwReCVT1eDPr+wjU1YHQ7qUkKDQC49KpBrg5MdbZmo2MU51Or00DOelTNWhtnORyMrOI20ozQ5eewhbbbLnZmiiNfLJiFrD0gnlJR5aTLXiTdB1YHUx/Bv5HEbM/uExGYvC/mIeW1JW3RMtvIg7yBjzHXPwPH4iM1f7qrdo5Q8V4VlrqaWiYZsSTyMXa9/MGx7xbJt3uzRWIv0foeBtE2ecyxmR9e+3j46Fs89FbPPb9Y5YrQjAT8ysOg8bGl6Z8xisi45NWNvK/0wFZrqm9lAYmpLczt45/Fsk5R/g2V0LJ1/tGT3N/h6y2jbOjv6YcZ9FppFcoyYSZqgIZi6qJksrBU15ARJ6MhI5YVVtG3oYWA+v/XJYNOBTHKIjQgGDUSAzB0TBtrUZJZLjprGwjbJkV1mGGCHyZl7qbRCf0l2oWR9f7ldMS2Fe6hkxnoW1jbgeQr+K0AZpgqkc+xXOQw24vELM5SytK7BLjTVgkKz9+l+e9AIx7hcyWRWb5fCCovWaUElojdUUrvETfy/IRmIx6Uwa+R2GsmYJH3wTr5P89HwueK/JGY3NyIfT3bxp3pTE49hVKe0s5CdLSuAjUJKWyWY3a/478cpovDpVdEq1HZWOTfGbiOSS+ZeYeVK8FlhHjAlQ/vA8zEvBBXN5WxsQ3vR6gAwST3piQectPAUuP7MneiZb9siuybynTldGnGiT17yfhOTNi6JQXGOVtzAjR3nWXiHbfDGbmLBlikXMsYUuaXXN4BbtiJd2KHNYniFBxZW5jqXI3+IL+HZoGyMKVerlvJSJwBihzT8NTCWbOGROS9YNjZIJOjlQkjf7fc7s+5aatM3frxzAgKxd4ALZDz47CxV/Cp+jhdcD5nNgdvzQEIefw5UrlJmppxociSk4JV5ns5kLE6Zfe6QZyGhhZtLgdoST6UeCUJq4hXvAguZ8JDa/pplB9BUD3ohIjRzFu5NB4w4hsfvTDK40LYUptNK+9TJK1VBq+EWOemTdrWBp/sAyvjKttimaGXFTaw4ppAng4mFv9ooe/HHhPUugmNY8F0R5DG8X/GCoRYzaUlIvoTOHF8C8zPaWp/FoXoOe3PIlEm93uaa7inMklwdbazkyktWlBquv0Q0+oF69sjtNNIvmOMUwPFOtviaxBL6VcO+meWJvph/WIzCOQczIw0LrXhnYbbK6nxc1dn31q94zPgD1J5AmFgb6oUVt23+15tx2y57R2D2qcfCeqDQUKwz/v0yg9QrjQfmnZDQRTaTki/FaV4ln9hMgzPNYyVphcAfj/QMefGfBkfCGqTTEFzL88FSBmUevK/BXDoF9dGggMuOnDPkabwcwslkBS49A6XRziyuOFmQtEa9CsUaq7PrBgxaBuCX/RWMdcsehklMq/MR6IQGlmYgVRpMl7/c9sdJahOwF3DNdbywKbYFWhiWdkipTTNdMmJQl2+xhKZtc49gzBDJN1hC27K5ZzBOqbmF11sHZ4r4cRlTKunGw7q8MzquGTEdzZWYN9hxrkcecjKGGCTDcLDTeWXXPDZspbM2fMgz4XHhVUVOM7SyyV6EODvsmc61a8NNi78EpFNgCh42qdhBZmIKS+LjNNlZiF/BsssvUNqE9Lu0Bb58PiLjtSd6eVIRGNZ3AhPqXSfMkdtpJJkdG3JgV4pw2HRND2mrcAieV0w51Yx7HzQ+lgAdg7m0eHpbqjN9OQqcRKhYjd+C0TbqOucBdpRhHUuazKhn2xBCBn4d+Kbb77wnnW1mMpal9TGF1hEC9fyh9XF0SLHinr4va/u+C08AIsuT9A6dxvQCXMIcd+Jx4iMuwzA94qVHACI1dumggrDVjFYjtZ1qly6Z5Oq+FZswFA0msWhiFQ9DDDOvwhGv961ojtxOI/14mB3h8mL9STKyqrS7kArYrLn/IPeCil+2z2K7Ib7KGzvkLjUMQwEusDg/T3xLZ1kpAWu8ttJx3YW2B26ngZtTHeb2omad073AqSbzdhE+A4n0ejv8beaNAOo5261j7d+UxB64PQ/cnNW9+drghR/taOUSU86LTGRFYspBSvRKJRv4YaUKD96wGUPV+ZSnk3FlmhJ1aPkCIFCUfZHhyj8VillwgcShpDbJdCiUxbeWso/Kai+Z4Q8KzSPwtJflabXJJLNQmiYROtzDZioLU2kSb1T0OhutSxpsyXKwvDP58/ic5c4vzaQRmUtSgxjpkl1uXkTAZaYWjT0SJT6/lZKV53CzUyJY9IhJFgCGiq3Ie5XSPZk/AHII4lFZvBHEsHyPMbStm3/8Yh4mLUyk4cUbVoYTYxhSydoXFELBd0xcgsQqMNpFRh4TRauECXJs87iTxiS+qCEI2N35LSbctsn+CYwVpVwYqHG4qc02PfJnUcVFhnAUifd3kXcC67QrMh8TrgslYA1hPaO1LKFpM7/BEJq2zT0QMCM565wt3t6DzaiSJTV5mViz7+wQsxOesWM5d1PI7sYslyneNWFKQmw8LC4wDfPtYrM9cjuNZPAgSRUPAMzoMMkwIOVuvk9W3bXUZgTi+TAcu7OKKMAiqj1lbDnxgHvctdkYt53GaSvh0qWoBEQbgR1s5SA8gvdDqeV8C4x776ueEncXu4dwVerhZGXRMEIFFqLBBD+mpCxAOjt04AQEXJ0xNGyl/bZSGm9bZ6FluRLGnGkqllZBtS24ae2XHHA6pM7kaS5vek+y1qa/cnWBg/w9OGJNb7rz6X4HPMhVFmVvjtG2TfxCxl/g6EEjo6AzJpYJ8ZzocQWMMGWUIAALkrSCCq88JVptSl2ZEn35ZX8JrGgTdJZqMQ/gDM1uNchJLO8RYCmnFMmAW1+guExF3cHZHLmdRu44x3pyMqW0N6IcZtTTdVMMl+YbaIZJHNwjOTNgdr8QBxQF6ISq1jlXeDeCczAQ0Kl+TLMzcHseCMDAxMGu13mBczp4S536LA33Yod9I/bB16mcuc7+hY3YAeijqyY7cPDrWkmi+qOkU8WXz3cFRSnleG0w4z2HXg5ydOZMHhEyIw1LfUEK3XhRBjYb4Na13qYdr7AJncn9FhnsSGOVQOEGM513aRnmYqlF9ZACOEU/+v1a9tq27mvq00i5BWFEPHWIQUG5syzUJMnEGhMcNHcUT3mUzimHWCUp9eQrKm0KXgGD+lSk4cvYhU0XbIZpHmJ8pZk2La937mbGaRZavMxyOLnphsMaNI1x8TFzc4cYFWwFjRc5Fs+2j+syc5lPCpOXCGzQYZL2m8k4XA5hBhUeoi+JK7af9bGWaueFBuoxCxthMsv9VNAcuZ1G+t6I7V841tuw9M/JxAygylEOFYc34+RQMEymtIHtPmQTvx+5nUZq/w7AM9zSy2AZER4OCb69Rz0Xx0yfZmVaLrMMqLmcZt7/V6Nnh39c3mmy1CWQ3CqMSmHsj0Z6jFqPkmGxASBlW/KgRY2bg8kWfi9BOIdS2CzBs9qGiX800J/dHIpZLdBq2AL8Hv6El3NvmxwxgCuJyDwckm7T/Kqei5xt86xfMnuYpxgrm+Vo9Cs9d7P69J7xvGtJiYboMBRCbw6yIEMFF8m6k6DBUekxb1Hk1MXRTmzWcJQtZcZQFLDANIXxdFvi88MtJUmwi8ygMjwVy92SnA2MazJMB+xbYNlCWufkx4wnvaVqsCsTZWQWVGZbV7mE2Viqt0MJ7oka78dtp3Gbk3x2e5GG7RQAcJLVDu/p8zt/W97PzfGUKGkdUrE0g0DjRZIqM+iXwGHhY5r6OcIzLH92TyX7Nqx9xdU5zhlMlmH+w4Xn3ezzEJ+iAbxnz9N1jV2xAvSMGmAOzPbj6fP9NNsYuZ1Gqs1utO2REw3FKVoezI4Kej6J7cEsTIhP48rumeC9g3JA37U1G2tAVNb3JBxg1YaStyFFiHhszJyEuldh4EsSiT4JIGZnPmWXLEj0snmoTS09CmIRlqXhIuA08G9gIH+wSznrmxO1cgm/6R58KeWwSIR78GOGPNZRjgGLy3BHF8XA5FCZB3GPZXzE4cMfCEKbjMMmJwtDRcDhRiuDSS7syMfeKzebnHp80wwurKRJkZdGWeyki3dC6L3pQ5Zoy4IYULC9WLtNkmxKtTC8xYnOwiCpk31EzVq0oyoO3bd9g4fEAbjQcjoSpEI5Tw95/xmrir0ej91njdtO43wX0PbqXCtj2KSFmWhmOZPbi0JfTqV8p/zJOpJkhZNvW2MIrDDtj6EkmGItUuGwJJtSfTVJcniPc8BmFxhZSDew/Aw3KnQkFvI7SpbFDBantgb7Y2/DbNMNm5x8A98wGYR71GZFyd5iSJ/dBBG/HRPjNRd6APByYlZbeDaQntWz3PelHqHjx9qeqUObLI71MMsszTWZdccFb6yRkcW/Bq2H4eS9pX2SzYHb80Atk0/2jJkZTM5qTSo1GgbSNXlmzGHl/TsgAatg4d8gG+a4iF1pjeV4KskeQC8nSfzUh3GKvWOWirA3fUGo+gLCev1yK2jbNe/8xwyb3mcY2g6eM2Q/Ab8nAEGyGKBLoEPpjdTZI7fTyE1a+dbCmRWQIxTKWRpUhJ5/lQ3Fhjf7+R9tCBOyKV4FUup1Xb4EvkwSxyxSmU5XX+f9cleFqwNASGrlmA8xR3u4BmaM3E4jGZAJ0hgWwMIfxMafWguOsAWFGhQPf520Jog8jlMrjHfsZPUD+JJO3gr0KCeC9KneiUOcbS7s0jyDFC69IJjYVbEztZMxFexMnWPLKrp2znTZvwWYTax1T7DMcOTd3WZhtJKzoFcezDNu4lFjrkIZNLi7t20O3J4H7sgMVAFQM20ADrnemjFjs46T4rg0byGkz24MKFELybLggWWZSa5i2lFw2301Pd2FtVwDALUDEiY3EFyRqI0e4OvXyT/HUvO4WSTen2rAFxu75uMaHtM28XnyCjmC3WXeGhepcxoAkmBnTdJV5Kn00eJT3lNOrrEy7drCq6nc4LBhYSgsYfNrBWQrQObSW5MML7RXnbdsmLkmLGbsRcQ63csaBGALplmz2RxrZdu2hdaq0L5gHbqIx4Y7ZS/WViLjJZJMCtZbX1kr27Z9qb0yLZB3CmmHhe4nHryXFvcrp1yiMYtEzHguCCcSXO048zBHbqeRe0k8Btcy7VUgDU/HLJ8n351Ok1g82KtPb15lez62O2ODqwXEDxJjGtguXvZVgT1nzFkcTHjjgzH9u8TmyO000vUjHN/AtWLvTd5K8GeUQ0I/pDL8TmKzPmQ6Pp92yORDv20mlhz2l3AtzMgdYjIAixIriZnt0iNrK1Ez2V1JC0rwlg7cbHGS4b2leBzp8S+bWKrUyuOB0oKm43bio53M6JzQdc5rZDCL1X8CbNZT9e4V/apsgmtTVscsWjZ05cXwLmcKM0AMdoWeQbLHLO7h8AnLpV55J1wFhnUUgXsJwrpsv9yhRSaFejvnkJJ5VfhqYLl6aJE6PtDVgS+9Oz7myO00krdvOlAamNcocmKN86N65ol5uFzC9Kq/wYyYpsE5YrKCbV9vRUy74Dg3Zujqrsly4RFbU1AgMjd8KsGALUp0xu582Ry5nUbuetHYaJJ4wYrFWdvhmMEPj3zaVHVNLRdsLV6rqipv2OENT6vkCg4q6cgS2vPsiG11VvL7xPs+0GXqBZYjxKM+AAugNImtwfvPWn+Ij6ck9UO8xAa8sv34EvBXTnJmzaj51LLxq8yfY9Gckxr7lsA3mD/TormnHmY0aJ39Y/GKUipdXyAWC9XEeqdyT/zO42xmHGClBTxEJhJQZDmquXnBBId+mlT1OGNsvGAdhqS9QkVDrVU6hafBum7SnUmPGM2B22ngpm1dpdjXYKr93CuxReJ7ZYBusLNazeVoHpjYO1A0o8O0ZL0BXq4TLgxgnUBX2X9iEdAxUt5hHWT18V9E3X28HST+G71VaLfQhj5YXA3gTX1lgS3N6Bz0VYXy8TiUvsPj3vv0u002i7OpmU2VLFr1eLmXyZj7lV3g1sBS7W0deDdvMqPyuNxrjdxOI3fvWiGVqW3Qlh2XjRi6F8Gw4x0rNIKNhjMpkqgqzEHUCwtseJN4CYw6wS2alV7gMVgKM3+gtF30XbsVZyZICUC2PHpra21fZSOdPHVRsSeHYJs+bgmyQo6UWJjmhe2zLeVdl2HOAqmpWAcw04GFkMI4ISpoHZphj9xOI326bFNgly0Z3OrxxhArcek9IGgA7ERnvIlGmQ3UMWlvN4askdtppB8tsuM/jpobW+LhbuGnN9sz0yVublKpfR/ZSa5YmDbGLOJSYQAvgGQ2Dh/3RnsnduryTTMmsjQFS4TOrPU86CCKQb45YRWPO9tMe1XZRtar7tyCtcLmiGcSIwuDZA0LQE/Jmn7RxyCCQwkQT9Y0MZYpPDnSA+Rh2Qi9LTWCDpVz+JlDl0xytWaSeyaH5zk+f6nzuieNNusWiGc95OJgF7i1aYZNSb6cZpjUwTmoMgNLa8qVQf14q3pwepmdWzWFl4+Bj5WPJzZgHb7Jdgz81xs/25x551RWZOnrTZ9tzrxTKvtYZWFUDm5zpQvbL9xcifWZ7+ToxJlcFmRGF96kzkk+ZEoojveFc9B6xTCdrPF8v+5kD9yeB252AODmBsDtVE0nXLAwziUzzXJSzERR+3HzYioeC7U560runFk4OhLrwhUuYEh65SlfG5zoLlLz+HDvHsTHcq4L7SUg7R0e5CWM3rDUEoOt8XtMoGnUnPMqK/SxBKGD9sJIWRSDmni0VwShnyT6wkLa3pXQZhk2J1lyjO0QT5tLetTO4IEr2TIjGIx/JaIcjM1McScZZ+rh0QkrGrKSKnN/D+mrQnnAfcUC2hEVhxaZFGrdHKfAz2NyAic5kAH1O9U4MRCXU5ghhpXzrFLPoKoBRqFszolSuATJpFPrkugbD1NZ/G/Q0a1dZroOuVcaREVLzVlCA3g6wAOiqEzHFpUMQr4gyF2tCG3Ge+taO5LZ4xgTM4VmyKWVvbgTzAiPozqdaSFTvh2xrc5XgpyNW97hj+mLL7xZwesgVHVlGLA8msXVRFeKOqAAFb3tzcdkKmIx2JVjb09YWURADB+JX2phMdV3CKhNKV269J5bLQ2+RFYDD5hStpbg9fF8mOyzJXdtsxVcWBp7ocx0+xsnmiUstY2zHZ/weIbNSlaml+JnYK6z2EGWu2tR74HDmAvUsXhnDnKqJ09DbTKlPfVRjls3NXasLV/B2X+mn58IGzbNsKmDbcots78SMyr2UxabQInxuzK9eNrljgSEaNhjkmNoGxLb6KyYXIdfOIzBMeCmuV8Kyp1+02Bwgtsux6DpDXwMhBiVc8zK/a9A2YbwrwdlE2a9gxQ7hHAvKxqEwEw9A6Y3l6NerofJoZaFPffFGbmdRm720ejNPUiNTe/3zgsLe3AJ9dw10d8uLA0cS7yOmkZeHIIp7FnTRK8Z5+6pxDs3OlEmlwSZjvraQjmDBgK4KkiVEikkd+PgQVTgRREwS+hX0ptvgzWWcxU3cA5s6qOVCjOYeLeLm7SU8eRVfX4QRuZaTF+nLk9Mu4S7zAiFx0Nt1rrOCDLWxssGWYQOvUtTI3nK0Bce7pTNM4G2uVxJ97PM0BCoZivLrFxDe1R2icuAVVeFNz4GaKh0PUdtZS/vwMKK1YbEy/LybTJn0jOXLRnc6rjB4pAC09A7xx5mnGLdHTUWYIJXCcPHLAn2uqlKCt5RBc/+G/7pF5MC08y7xx5miGLhJUAmALEjd+IMg0Xgxw9ScOYKrvm33L2l9tVKVKJ9Bc4zveWiHRNKj8eNW9O+2uZ4oaFiMfTMKpTc36nP3DXAwxrppScxmGPnuJ6dsq3auktkLfKmZOxTZa5TTu3MoI1Dyy0Gr3gkyleSbJl+ZSM6rfdke/4uJbX460KLEnlPIJBDsmBFLbzWpEWqAqtlDDGNjRcJXINiW58vNCm2lfAi/XY0YSHpd3iozSxdymQQrJWZq6x1M2XKOnv0ST+lm8mYPBpkhhhWZq5KeZ7B2g/MGpLM4ZsXpbD5nEn9llW4YDJyHwzFdSpwrqUdAHrGVRcqTXdhZR62zWFMXmLCqoXAz7dZASX7fYwRmesp5Vgir3gUafb8dpv1/cjtNFKL0Xb4rlMWtYKi7H0H4Y7CyGMfiK8B51urYeJxylmuoGChqhZW5juwEHo5FKws1m9BDBsDvGC/7ecuzNB3yJdJpzyraNnQpUGCREMyEsVjkiLAMR3272wWXVNnumULCzAAOAheoN4k4fzWo6OV4fS71MviaQsjBDLREesvBqXhv5FgjOGMOjTDpCTrkh1sA+gYNc/KvLdI34DNJuLaoWjTFV0IzjUQKBhaJGRM1lrfC+PAhNIEMrkBWjpegLON5AtrNMaEbQSlnMQGctCmWTBsap1TEdeYhRa0KDQes/ZxE7vNW6J6GZAvKXiJsFAQnOcM8i9EZxNwvTC66Ue/1RwtYx4TCO0b/DnRD67/EOf+qDlqjdxOI6XmKGtXY5qxrkmSjTqrRo5SFTBayPv1ElYdYGsBRo+IOxe5I4q1YY8u9lTBRzwyDdZpGAfWAkwmjG/eCx3KPZLjUqszcjuN1CpPObKE9qUzywx+fbor80nHXbU16cqb1CyCGIVpBx4kBLxrSFlXFq7MRSIwKrU9cjuNdC9P2dehvCA++ySwtg9WSGkHp+FBnRdcyHXIs02HPdNoGdKvtymmlTBdEdv9WnjIVphMVIRa6kUM7eSQG5OHmXNN6QJwUmkQ8bmzFqlMfgna4UNewlURLoXlXH3K5nA6m6U5FOQ9W3msKBkJBFonkisM1M3Sna/CkrJm8sFCzYHb88CN5U2hkpiuS4dVrrNJDAZIgI2E5RYR2MFWss8s/HuHkyvtH7sXkc93zm6mWFKdpDPbGvhBlehxaltXz/rZtnKdIbHmEjPMPMTAUBh7GyWN8Nm2xJz2eyL2YNXsrPdUJxmWAJNEtQJ0IN5R2R65nUbyegGRqeQoKgEDP2bZ6xxKUe7KuZ9l7y6vPZiaqjCcndG1qgOmtksXGe67+dyb9OssiW0a3PC2EQz/FkNimgYvum2GbBbicmaeNYkIqUbhdTw92uZjmIUi34LZK+UFLtso/vW4bGKtE4G2/fK3mf70lp9c/cqmkoJ2bJ4oJ65tQNeppRCjA9M1esGnJbE2V2ctzLaXJ+Y7ADRJhC4hp/qUMfzJcUUoAGv5QpUvne2rMi9+3EzYdpHY9HGeLmxHmgeRZLCeOEybtMTLBRuoj6O7gDNyO43cyTOQOEtAdkKTu2bGWJE3zxE0vcaHm0k8NRRTAWYeQa6ClI3MLPaPxZ/HUYQ9cjuN9Am/TeGdT7G+e13oiLrBj6OpqNSCpJcibG/Usd62qV+4BxvE4N3rKMZwMDFzL7JC11c1utERHi82obljHxnH57XQZI9izC0xI4P65ixlH2G7CzNhZUsB9ITlQ2/CrHrlMTBBQfIt4aMUHtrJFwSo8hNefP6xeQnSrAlWizwHJF/bXVtWxrUbpq/wOMNwYWbY2WUlLMERkDlmlxewhbeGJNbI7TRyEwYBRemELlrllKTNFcgGlDKNJv42tDQHPT/B4yEObZCmL7ntLKRWMiPedazSiXNpEVPONCCWZJ1pHSAmba/6aLhIruE2zfy6okxSLZMZ4pWsWvCi0V+gYeFa99D38qp8jH2b9xhTzveb5S3x3iZxkvfl+/cAs4m1brTRjNusY6KO3XZMsQvZBsCvwjkewoMLJxF4AqIl4aGzzWfiWnQpDp80dGEinYWJ9xmWkwWdNywG/23I0hdmL3RJ999n2By5nUZ6frbhPJuRQ/x1yNJqVcq3tTCeLkN8dkNYaC5gmr5A51fVeJi8syX0bJtJXR+oRcncPrLTuBXw8TyrlfZ8mLS32bUHbs8DN3N6bs5Mmi626Y2vMx8wbFdmADDyTYsB3dRrdXjM3ltZthu0Wlx9x3zYtmYJEkdWUQSEJbHRg0p00UYpWfoi8zFM2civkNjG7Td798mNaztLvrOfGNUVijSV1Nv+kEvcTJq3kG7WwfKNrFZDWOPNd72bzYxMMgUWEIhVS+/Lw8RKlvwUUO6iJmUwTCCfUpjm1Z7qXS043XEYnM3JPLphkZPnqOfn9mJm9UGoz7y0eeWW6nsZwndGxTYUFs3+DgNtm1zbS7K98K82ebYpMwHYjkLfdWKwVDr7hnKl4dsyt7qITrAOQAEWHDphjtxOI5lW2qDcgyVVoRXgHknrSVto7QKw6RosvU4nDX/HEHCOrG+lh6uRhefbmBSjVvZ5k3gtbUliwBOPZ91vteIVoEesX0kkfw4ErIC5knmRC5NPggFsKHu9AVL0yRZbxOyeU2wvgM4CxW+AORO43HCo6dbe9+Dn9zgzqZzNzjzbaFnSh+JtWFb4hsIpsTbsmtq4/gXghbkNR5jIHridBm5O0P7mn/+6SelmkH/lBeLJsrRsjAU20fBPpR4s6UyeXDpkOr1rrxBP5t2QBgPzIBXg8F5z7p3f7HI7kwk+0P1P7srMawaBrdSpwHScJCpnx65s78/2FO8SZzaSyFksRmELXGZbXSQlHLslkr7sEpsjt9PI3baMxoSNzhQzFvq8OTEgm/A73sFCw0IUSCzORdWAI8Ychtv+uCl16rKTfcNiW6EvxzsTwdwgrunoPvCkT+yEZ9JQm1w62m3shIWRgaqVk/DTrbM19Ox3w322546FNl2cx+lN2OVTCXEtg20xo6hEYccAKft0TLA1cjuNdFmdw9O8Hfl+9666ZmJbEdsuuDBtgPpCX5ta0XmJgz83cnirxmt4oi6dM8nfulsmUarqNlagYzcN7HItnmGhnotkFvn+Uqyw979t3Wz3dt2lGJlh3sgsRIuE79LSsKa34RgQ09jcE0nY2KPzOhUNQWhsOqOd5geIJnN9D6WwR26nkZuZuHJzs1wGZMLyhCxlhnnNQSuqzKmRjQt3BjTxUZO/EOFM0HJohOPkfiXE2aDlRhlNWr2QWTimzzZnHvZZSPnmS312dwLoIVcDmASES0zhkV7izJWqHSrcSCS0lwJjMTzJJ/jO2Kf2XQ6VdymEIcFRg8o9dbeOPfFOjQSMAxYD3D0HPdMBmDG97E45zZHbaSTpG++XBabpUDaW5dLTs3hll/cukwx92Suktyg182kUCXgYovdYgcnc4JqpBvyJi0HDSI0jaNC3jqQVoD5cs6ya66GGDTLr+D1wHP4+p56FUxs2lka7yrVXKGzhmgOF6w4bfDywknxcuUgaBOM7SAy4YMwzfb5n8vl1QB2rbdphz9IYZulboMMEAzcKZnLshXmgOTHDgrak1SvzN/Je74MZukO1JuW37sWUlCfWaW/xedGLgLzKkeUTG/7rmdcCSOXaFmaXNDIf0J15v3LZeGGdDqJ0SH4BIDbcLPS0AQnMf0sC1GycFDXldpIfpxQFv8eByvZWdDbu129Fe3s5YQObba+8QSUNqHivj9KxDJZMdYC9jkxvoJ72FrX1KZ4y8keuxE0Jz1ivA0LzO9ObONMw/qU8Hr3WEOEc6eSyE3QPMkeSkYhFrKwpuV/vMUdup5F6kVi6ZkGrC73WpkTaUnZXfU3bulSrYfUis5cpXWb6qJzAFimlDy2jGJBH9UCeMughFDb0qq3c9RXEX7yDZSTS2gsGrCddpbMIQa+wMryqR5J+I1T1yavNeb96aeuHqUwLPVnyPGw7bD/GrmDHtUy9hSouTlhsYKlzSKGT3PlrbJiAXTTFaTEJhYd5NkIeUifmrZPqQhZeXgevrdo9kndnIdAR5HdGbqeR/uUI876D7QfyU9KUhD2GQkATyilz4/PNS5HCU1l0us69OoX0rs5spoMVn/wDPQXi48bCto21rdJeDkveUZiphpfAT6vhjh4w8+y3zIZ8gCd47mG/qiVdmGvm00naMV/sdBMW7vF4rExNOg0w42yul7LScvwFm3EcC2mP3E4jd0hlolmlQrVe9p6Ptu/gEQWbVizLrmfj6JnEc0u876IiW5DlgZBp/h6474Bf0tRnD71wuZsc9QJSxk72du5rjtxOI33TZRsjd/qNxfqWbW5vXd/Vs+5MLdzoDJx0+unE1FakPNhtf0xPg2sAk1KV/To73caFhTzSNl+2QXLtg2FNVlZOM0MjNyeOMtlGRir+SAMsltLRKlHYEfhnPk8MivMO4SPqffYNDOIHe+kIIYDwWiTMZrMutzGZ0EJyw/Y5jIkngl4Qj/VuXJ5NjmdFLCK6lNqIyIOxycb2JHJJ6OaRWc8gmtbz64Hahl7PobY9ki/HDgcOPIfaJsrrwON9BFYqijOCDwjmpUSpk9d86LBxZmHGMhOXpOQK5nNSqbQDMjsnhj0CUGiZtFYfbSCvYwqihDr3KyVS6ZQJ77Q3JT4nhS9ImrT5kk2BPBg0MHMp3LFgFssIYpIiz+Wjltm1LLtrqy3CvxTwROiZuYEi6FJp6gDYPoPHO2yWspItFVZfAJNvbCJWswY4K9NWeaTV2Fp4Rq0aIE9LrvopsCBK/OQViUHZxizhjC2yFu8ca2haONfgGObpO/ahtbPcSIvp5CwEPNa0Hew1KxM9JWfzpo/ZCFYQr6amFQU8xLPxcWUucGfV44SJh9Rye0YjQZ0uYCrClmDfpnonfNp76nza60hqw+UdRTUMzmh4K/QiuRuwk8zYaEzTZHGC/X4CzSfNLfb/UQDY2zTmDlu4ZxxINUHSxSwD4d5mxd6U9j5zwiImn12X6x6lytLknqwTSzbHXnzXUHtXkS1WsPSg1TpOurmHT3iMNWGbJypoqWkvMJBhKgePYPG8SamN3tZuS6kMD0XAmjOXlRxcNJCPO5Ov8JgxA3WxnH1pbuKv3zb2TvBiDDZvWVcJxk55cBIZPAec0dzMe3EX2SbMQV7M+urAVCbWOMA/sSJXjm+4+gy3HoBadGZlRjOnZszC4IKs+BzHvf33HN+zj7Y1XUhUZZ5ZsgCgx64Me3zMZHGe+bKN3ULUs47ciXqJPnyOTS4+tMTyJq9gz0bJhajHViu8JS7whiUfUouCRc8ma5F1UVRmPmqqAB+XRGuZmdTEm96/7C8JLDeMlwzs+qfuWV8FIA4iOE67lWG1Lv3PM+WmcXY36LvNvPbEMpGQQM0vtbNjxFTfy7KTnuUzue7aE0sKPSI4R2UIgXV0JNZk8WXXiJsmf+EmxK6PihKVuAXXZ2dMPCnDhLDZC4vrvNqD9o5dSD0cc2haOBe930P9d+xCa2N5XqRNvg/lmKyK2prc0WBnUgBSl2uL0Pxegf5HHNIZuZ1Gbs551s07uHYTF+3Tr5VRXxs+bERwNqi1m+8enaOApk553q9N3t5y3xp+PinqNLkN2YQKQLDEul1H6Rln5HYaScLeeSexiHRt8urqRRv8MSLUZVISSzJpjluXK55J6tSAiJS9cAeLCGaWVWKljAkPa/EtDDhjg/XCsZSN5HNoRWsDtlwgMonGUksgQjcmWELoUtjKdr8GZXAVD1VtDF54qG0ndNopmp6TzJdgDCCgsPFpe7pV+5Vb3dy9rkdt8oqFW5H5InNCKyAdz/+11FZjJTt8rXAv+lijv9iK9sZ9yzLEW8EtJdGF8I6BejhcGta0p8OCOSO300hNvocpkD0H/cA+0Kk2vsWVzsKg79BpS0l9h8lMaV6ZGMn6obnqlKbUd/RovNiXB6euS5/yX46HSSdUzqeU3MgbGGfEGzJ9ubh2GzowbSOvC4QGbK4NhwMEwuA5BH4w8zKdXuei1yfVdtlpjfN4NIApvYMUca4TOxYIT2CJgjz0y+lQ3TVaju5hpXhJhzsG7rsGQfQxPe3KEHCIyjictbTW/etX0l4bz1EwzfOqkhCm833zo3f2kbnjq6+8P8+eN4PdTyobGeDf5553ybofwB6yaBAMvTFma5+tqveoXisJWKmF9PhKNsKUeBJ0Eh5nP869nJHbaaQaASrhlAyO0ugE3Dxa6Fou087dfa+ZK3iGUMPIUj88hONkwjlpwOpx9HJxRm6nkb7lMo2R9y3Gh68N+YYrk/SBkWx9EzIU/g07niHFAQnLjqyNnqrIEJRXl1iu8uhnZhgjF+5McPwG5bDW26VoFgdaeTcdGCF5wBd41GNQDw7oOCOKCxKm9Vt73xvideytSv1I7cjFsgyoA3c2Nq7NmB28agMxMv6pDbXglRFcyNdl6gYWTRMqJLALKsrHvYW9NZtc3xMWBKlZQTEsvnnlYIeJB972tDbzWtbLYBO+QXR6sq902fNtAMzQU8qRWYorv5hqe2G+YarN2XOZnwnqO4l09rq9e73d9H7n/ej95p945MQGnoUA2KAV2EbjUibdOnbSvdkq5CqFubeX4p8InXiSVKZUxzqy7w10cBXc3A4LY8CGr3zzwz/u4aLtWy/cmLaG2GvurYGxYEuTykbm/esJx6MylBGn+l5MoeY5s6z5ZJdC2XPsDlOxJQTNO3au+gmscAUuyy/pdGK+Z56tmXOx3Ny2C+e5sW1LqOlCHZ0x7Mf8ndH5IsINFmafL6bZXJOF+VjSzwDLWS6lgi23vUaA8SWecKZ2Lc0AocwscS8/mFLgwt8cDfXm2VyUhcd0zjzbc+d9ivHdd3Pr/ID9N45Omqsu7//7y58uP/11vPzxPy/4X5dw+Tf8z3/jf37Lf9827EmSBapVYsGI0KTXZuXFDBZ9qA+Pf3l6XNkAqWhP2ce3PD6/i/A2IHIzv70z5cgQatP/nP/1P/5w+d+Xf8cHZHzA9tPf/OG//vX3f/hfv/3N5ff/uf0Jg7Hr8R/+X/cHfn+7/PQ/4+Vv/u/l70WScB2X/96grDwFaNDMx89+eCxFh/bP3n6zRfzRn/C/w+WvAmYuZ95imXmyIFK7TK46KDN+bfvNz5ef/g5/Hy4/QyfxBz//8/aPl78If3n5p8vPv9v+9uft77ddCJ4KAv5CfRbi7fEPhBCiF+mVMivjA0JEQwiedbAQ/3gW4u3xD4RgSwd2dxgJnsJHhEjvhSiBKbUdNOlJiIfHr4UASWTGR2H15/Ch5ciGEInVpcKzzt8eH/9AiMRLNswSKrN/RIZiyEDKzRPp5+348PgHMsC6hhJT0G3wASGqIUSvNPHYh89CvD3+gRCsQ8Nj7ySdpT4gRDOEmOPKinOjPQvx9vgHQkzoTgDFZBHM+BEh+nshaopwv8i5n8Dx/vS1CDAoAGtwR8wahnxAhGGIAHpcGfMuzzK8Pf6BEIWFCEMDnPKc6gNCzGchGkGisIdrPGvE4+P4ZiUgROblPxZte169x8enP5iZl3ZPM/3w9Hl4iZ2XQc6z8vj49Acs6pylGv/THzw8Pv2BJgedLcTj49MfjHats53R/PHx8x/UMFki8oy8j49Pf5BZFyqcUfLx8ekPLCv+bNyf/2A3CQ/WvEhbNUkCy4lnc6fHpkmIDJW2ebfFk4XuJswUb7b/OhP5IEoi0Qrqbz7K8vb8I8LExqppdfIqePyVpvJNGOYI0S2UO68Pwjw8/4AwLBvQckip8z+/zmQ+CsOSgXTA5kmYt+cfEYaZ7qUPYV7l15nOR2FAV4Ew+/59EObt+UeEAbKk9lJbDOv5KEYCf26RNPRZjLfnHxEjMVcwx52O/ior+igMTx5Z/f20jR6ef0SYEHho2UVZ8q+zpg/CjEi/rEow9UGWt8cfEEXahMDoyC76dSb1QZI6eN0w9mdB7k8/IEfl3acWikDLr7OrD3LkIs2Aw0mQt8cfkAR+SyZbjoNdhX+dcX10wSIbqB2Kkoznai0f/iSwAdE81jMZz89/Ekdl4tY+8en943d/wPtouRwzlIzn7/4EoJ9qKnLf7/FP3p6/+5MoPePC6dvfHp//YMIFHv0wCOn94/MfsJJcqAdop/ePz39QmG2bDmBN7x+/W41H8vK4fk9mNl1+p544NfHy7Na6L7M97O0ffqULjz/Y4wEBUmhM4CEeUKXQwSDjSjDxU2cXPth1smxifnj8y9NjCDWTlmx/eMfD03ss4P5fKy0+XljFIGNXtdbTjnEpU/JaduqwhwNE6I3TF7Ap8a+77L/Zox0MFlzOwYJ4xAoyBeCUpP4WIEgaINj/NvAHZG3wT/bHY06AmOX9nBgMnCcnHKjuEOg6i4H/kIDg6wxv4E2WmlmXuZ1EuT/9gCSFvCzyAJClnl9JYvCPB0kGXZGp/W0eRHl7/AFZRiDAlT4jG8q9ksWw+w+yMCeefYzLeBbm4flH1ghqyDBpgjnorwwcEPy1OISKPIucbD+K8/b8I+IUMvzIcySGjV+JY3mQD+KwyzM7QZy05uH5R8SRguuRJWjCK72JP9Bgmii4sLyk/7yd3p5/QBpWeOKFiQpAaa84WvyBGtNPgfOVFT0fxHl7/hFxGELE1PA2RnvFBOKzJr+yCS4qp2tMSbxpB5U/ANYPL/khhltyCLL/A77g/wF5SvwJCmVuZHN0cmVhbQplbmRvYmoKMTIgMCBvYmoKMjIyNjYKZW5kb2JqCjEwIDAgb2JqClsgXQplbmRvYmoKMTkgMCBvYmoKPDwgL0ZpbHRlciAvRmxhdGVEZWNvZGUgL0xlbmd0aCA0MTkgPj4Kc3RyZWFtCnicPVJbbgQxCPufU3CBSuGdnGerqj97/9/azGylzcIEArYhs2RJqHypSqpJ65FvvbRbfG95XxqILxVVl7AlJyUi5XUhI+oIfnHGpAeu6eyS3VJ2RC2liulaLo06hjpsYp1jX5d7j8d+vdDNCm9YK/BftiW2o2jc1o0ReHEQ6RgUkf3ACj+DM4gX/fxhgojxC/kZ4ql4i8ggSHQ1IKYAFue2i9XoabAXmBtaMIm1lgsQR41w1rd9XXxFT2Mjrvia9LJ5zfugsdUsAifBCM0QRQ03soaaninqDrgl+k/g99KkzM2x0AMIbVCFlMr6yeemaOEkghuD5aCMojmA0XPfk+G1nje+bar4ARyKdj5Cj4cx+MZ+HETQtyDtPbZyvFm4gRAUgRYI0HlugIQZxFbKPkSb+Br01fLhM9z81uU9nqKfOjNwMBKd5dLiIi6w3hTUFmTjAG3WDGouAScyhiHhQ8chcvtQ0LVmehubecui9ci0ZuPoATozbOMpz6L4nhQOM1KcZJMYi+aUEp5iH5mhrSMK4GLaNkRADavzoUi6P3+a06WMCmVuZHN0cmVhbQplbmRvYmoKMjAgMCBvYmoKPDwgL0ZpbHRlciAvRmxhdGVEZWNvZGUgL0xlbmd0aCAyNDkgPj4Kc3RyZWFtCnicRVFJbsQwDLv7FfxAAWu1/Z4pBj1M/38tmQToIRFjSyTFVDUm0vFlhrLGmo1vGzyxvfE7LBJ2Cp9hOWGlp2HstG04iddwjiyDR6MnnJDlNcJCIPJgNWId2Nw8T77FlR7k8Kt6lG6EdkEd4YnYHK8QVzm/+FghzqLIvCrF6fQ6oaM4dHeCWrox9TTdazZvzXA5qIWIrZX8XvgzkuT/qN11S9oH1UbGJPJpSG2ZjVwFp5yqLNaFZD5pOoudpiCSKUX3FW88MXtqLSFb7KeSUSmLWV1JMDujS3LoxyhT1TtrIaMCZ4wzIuKqzDfFsvD8u9f4Ge8/0LZZaAplbmRzdHJlYW0KZW5kb2JqCjIxIDAgb2JqCjw8IC9GaWx0ZXIgL0ZsYXRlRGVjb2RlIC9MZW5ndGggOTQgPj4Kc3RyZWFtCnicTY1BDsAgCATvvIInuFC0/qdpPNj/XysYoxeY7C6sWebE0DEs3VyQ+QGpuPDFRgF3wgFiMkC1RrzTBRw0XX+2aZ66uyn5j+jp1II8Pzut2FBrXVWyShu9P7rBIg0KZW5kc3RyZWFtCmVuZG9iagoyMiAwIG9iago8PCAvRmlsdGVyIC9GbGF0ZURlY29kZSAvTGVuZ3RoIDM4NiA+PgpzdHJlYW0KeJwtkkmyHDEIRPd1Ci7gCDFKOk87HH9h33/rB9WrRCDIZMgsWRImv1Ql1WTrld/6ZIpWyb9H/Ypul7+PRom641+ii/hZcrZ8HltL6opZCSHL04D7RBu+eJe4HdkHt8eRi7uosLY4TrUJXBUlGMtgLAkUGYo+TxhlYyMzxY4POjo7gmXtCfC+6C0qFpzrih8jBzvB6hw3rKT2QXM4tg9+Hr0xlgZYgT6nRlcro8DMKdYe2ENiknGlnEZpA8rKFtxt1C2x9Q7Uag9Crj6WM+DdEqGso13LjWzahqtoOBCeO4gkVdL2rCeYaKPvFtyWkd0/DAWdo9k5XUXZS7CwvEPjzeJEfXbSCzf4Gt8dttXZNK4HhbhPa5LCzyi/N/F5fp7QhEy5j7aS0rGQsRVhvfWhYmNFxPlR3I4xskbI/LyexV/nmjY17pnBlWT1nXXLMRgzhLG4Ew023pfCALz8K92djXnfAJeyc7CH/VrOjvqHd2RyWm1XmT78i7OGn+fPf5sRkesKZW5kc3RyZWFtCmVuZG9iagoyMyAwIG9iago8PCAvRmlsdGVyIC9GbGF0ZURlY29kZSAvTGVuZ3RoIDExNiA+PgpzdHJlYW0KeJw1TjkOA0EM6v0KnuDb4/dsFG0x+X8b7yhpDMKAiEgwhHuulaGk8RJ6KONDumJwH4w8LA3hDLVRxqws8G5cJFnwaoglPP2UevjzGRbWk5ZY06MnFf20LKTaeLQcGQFjRq6CSZ4xF/1n7d+qTTe9v3LSItAKZW5kc3RyZWFtCmVuZG9iagoyNCAwIG9iago8PCAvRmlsdGVyIC9GbGF0ZURlY29kZSAvTGVuZ3RoIDQ0ID4+CnN0cmVhbQp4nDMyt1AwULA0BBKGQNLQwEAhxZALzM/lggrkcBmisEA0lMrgSgMAl3AMhAplbmRzdHJlYW0KZW5kb2JqCjI1IDAgb2JqCjw8IC9GaWx0ZXIgL0ZsYXRlRGVjb2RlIC9MZW5ndGggMTQxID4+CnN0cmVhbQp4nDWPyw3DMAxD756CI+hryfOkKHJI97+WTpCLTZHGE505IYjikaooKXx0cJ5m+G2xrWu84aOmN1XMRPZC6EJawCsRETiGu8BnwFbCWmGl0FVMLB3qBQsDTSNIaOvd4OLdYCPNBSVRW2CyiSZ83CS6kvwQw3PvYp+UBSc56frqu/zx/uIa5/j+Ab33K4gKZW5kc3RyZWFtCmVuZG9iagoyNiAwIG9iago8PCAvRmlsdGVyIC9GbGF0ZURlY29kZSAvTGVuZ3RoIDM1OCA+PgpzdHJlYW0KeJw9UktuBTEI2+cUXKBS+JPzTFV10Xf/bQ3p68qIiTE24x60SYs+mMl5U/KhT152ityYXsvQdDX6WbaFPIr04OlR0kyKfehZ6kqh6AjQgqTO4LMk+HY08KJI2Cnw6llczVbiCPIEeut4f4GanSAWJ8MOjRqtw5hkG50UMjES8M1260Dd4EUCnMCXcwZ7t5zKNtDAs3bQ0wxbKjhtW/ceFBV86ar3c3TZMLGgCT447afIsKieu8sEEIkE4f9MkFIxiL1YpmJvhzNknETbEppEuEHHOgrLzvJGwoayZdkLPAzmmgvJscG2d2+mJyk7DgQRybMqjtBLHlhDnO+TPusbEZ+x+roVDts2ec5QU0MzYZ4TQRSB3k5KJmqcMEkc4xFYeQMWEe6if4VEOAXy7jG2cUlQTNDJiyKTZVfZFw1Svhy1ezPD34V4pLOBVl2EuP11ds0L/uewy0wZQ1n0tth2v34Bi+iKFQplbmRzdHJlYW0KZW5kb2JqCjI3IDAgb2JqCjw8IC9GaWx0ZXIgL0ZsYXRlRGVjb2RlIC9MZW5ndGggMzY4ID4+CnN0cmVhbQp4nDWSS44eMQiE930KLhDJPG2f549GWWTuv50POlm0oM2rqiCzZEmY/FKTVJWtV37rw4ueK9+P+hJbKn8fjSWayrdFNYmrXJfPYyspE/OUInmvNp/H6YbjUbJDnE9Xp8eit6uE0qf2WFu3I+3FlSDPjlOzxSfizHX6OxlOhu3XMnxG8OIXm2Igc5+IJb0L5DbTchC+9o4lZ9d4ri0CKOEYET0RGlG8HGrua9O7ZjxwN6NEAE+T0qlBq2qUMCxoW52xzPF4X5CqM/T8r9G8dEGR6K4oDLbUQwTK6Q780sk4RekRBWbtFljLZDOqxeu1WdVYgMxGWpBe6BqodV/x6dKkkaTSIXulrGkFlPISIZqVr/WpaY8T6IzY1IAsoiEGtMKMhfXS7F3YmUhP32dyPbsOWWx35IKUOX1sRmQsXxPmuHr9dGgg3GD2fOfnzlL7SPu+2vbd1XiasOMkmw3PnCKXGa3UlX93/Hn+PF8/CXSLJQplbmRzdHJlYW0KZW5kb2JqCjI4IDAgb2JqCjw8IC9GaWx0ZXIgL0ZsYXRlRGVjb2RlIC9MZW5ndGggMjY5ID4+CnN0cmVhbQp4nDVRy23FMAy7ewqOYP3teV5R9JDufy2loEAcKtGPpCMSG3r5im0oufiS1eFx/E6w8SzbA6xTgRlc+knBZ4XhslEh6rgHwomf1R9yCpIGVR7hyWBGLyfogbnBilg9q3uM3R49XOHnDIYqMxNxrt2LOMRyLt/d4xdpDpNCekLrRe6xeP9sEiVlqUTu09yCYg8JWyG8XtyzhwFXPS0q6qJbKF1IL3NkkURxoIqMV9pFxCZSEzkHJWm6E8cg56qkBb0iOHFQm3xHTjv8JpxGOT13iyHCzK6xo01ypWg/Y9IdsRbO7YG2U8ckNZrPWt20nrVyLqV1RmhXa5Ck6E09oX29n/97ftbP+v4D7U1hSgplbmRzdHJlYW0KZW5kb2JqCjI5IDAgb2JqCjw8IC9GaWx0ZXIgL0ZsYXRlRGVjb2RlIC9MZW5ndGggMjc1ID4+CnN0cmVhbQp4nDVRS24FMQjbzyl8gUr8Sc7zqqduev9tTdInzQgSsDFOZkEQhi9VpCy0bnzrwxtPx+8k4c0Sv0QtZDZez2IuG0pUBWPw3FPQ3mh2mvnhss4TX4/rvfFoRoV3oXayEhJEb8pYKNIHO4o5K1XIzcqiugrENqQZKykUtuRoDs6aOIqnsmBFDHEmyi6jvn3YEpv0vpFEUaXLCGsF17U+Jozgia/H5Gaa/J27GlXxnixqOqaZzvD/uT+P+se1yczz+KLcSHvw65AKuKo5VxYOO2HMOYnHmupYc9vHmiEInoZw4h03WVD5dGRcTK7BDElZ4XBG3SGMHO5+b2hLGZ+NT5bnCZSW59mTtrbgs8qs9f4DmkNmLQplbmRzdHJlYW0KZW5kb2J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" ] @@ -363,28 +381,55 @@ } ], "source": [ - "zero_pi.plot_matrixelements('n_theta_operator', evals_count=10);" + "zero_pi.plot_matrixelements(operator='n_theta_operator', evals_count=10)" ] }, { "cell_type": "code", - "execution_count": 15, + "execution_count": 31, "metadata": {}, "outputs": [ { - "ename": "NameError", - "evalue": "name 'flux_list' is not defined", - "output_type": "error", - "traceback": [ - "\u001b[0;31m---------------------------------------------------------------------------\u001b[0m", - "\u001b[0;31mNameError\u001b[0m Traceback (most recent call last)", - "\u001b[1;32m/Users/pacosynthesis/Desktop/ScienceTech/Research/Superconducting_qubit_NU/Codes/scqubits-examples-Tianpu/examples/demo_zeropi.ipynb Cell 21\u001b[0m in \u001b[0;36m\u001b[0;34m()\u001b[0m\n\u001b[0;32m----> 1\u001b[0m zero_pi\u001b[39m.\u001b[39mplot_matelem_vs_paramvals(\u001b[39m'\u001b[39m\u001b[39mflux\u001b[39m\u001b[39m'\u001b[39m, flux_list, \u001b[39m'\u001b[39m\u001b[39mn_theta_operator\u001b[39m\u001b[39m'\u001b[39m, evals_count\u001b[39m=\u001b[39m\u001b[39m10\u001b[39m)\n", - "\u001b[0;31mNameError\u001b[0m: name 'flux_list' is not defined" - ] + "data": { + "application/vnd.jupyter.widget-view+json": { + "model_id": "7d9f0d4439a340e4b34515048437cb0d", + "version_major": 2, + "version_minor": 0 + }, + "text/plain": [ + "Spectral data: 0%| | 0/27 [00:00,\n", + " )" + ] + }, + "execution_count": 31, + "metadata": {}, + "output_type": "execute_result" + }, + { + "data": { + "application/pdf": 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" ] }, "metadata": { @@ -414,12 +460,12 @@ } ], "source": [ - "fig, ax = zero_pi.plot_wavefunction(which=0, mode='real', zero_calibrate=True);" + "fig, ax = zero_pi.plot_wavefunction(which=0, mode='real', zero_calibrate=True)" ] }, { "cell_type": "code", - "execution_count": 10, + "execution_count": 33, "metadata": { "ExecuteTime": { "end_time": "2016-08-14T10:44:42.893578", @@ -429,9 +475,21 @@ "outputs": [ { "data": { - "image/svg+xml": "\r\n\r\n\r\n\r\n \r\n \r\n \r\n \r\n 2021-01-28T06:54:51.173915\r\n image/svg+xml\r\n \r\n \r\n Matplotlib v3.3.2, https://matplotlib.org/\r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n \r\n\r\n", "text/plain": [ - "
" + "(
,\n", + " )" + ] + }, + "execution_count": 33, + "metadata": {}, + "output_type": "execute_result" + }, + { + "data": { + "application/pdf": 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" ] }, "metadata": { @@ -441,7 +499,7 @@ } ], "source": [ - "zero_pi.plot_wavefunction(which=1, mode='real', zero_calibrate=True);" + "zero_pi.plot_wavefunction(which=1, mode='real', zero_calibrate=True)" ] }, { @@ -449,18 +507,29 @@ "cell_type": "markdown", "metadata": {}, "source": [ - "**Visualizing potentials**" + "**Visualizing potentials.**" ] }, { "cell_type": "code", - "execution_count": 6, + "execution_count": 17, "metadata": {}, "outputs": [ { "data": { - "application/pdf": 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" ] @@ -472,7 +541,7 @@ } ], "source": [ - "zero_pi.plot_potential();" + "zero_pi.plot_potential()" ] }, { @@ -488,13 +557,13 @@ "cell_type": "markdown", "metadata": {}, "source": [ - "When the capacitor and/or the inductor pairs are not identifcal, the $\\zeta$-mode couples to $\\theta$ and/or $\\phi$-mode. To accurately obtain spectral properties of such circuit, all three modes need to be taken into account. The full Hamiltonian is\n", + "When there is disorder in the capacitor pairs and/or the inductor pairs, the $\\zeta$-mode couples to $\\theta$ and/or $\\phi$-mode. To accurately obtain spectral properties of such circuit, all three modes need to be taken into account. Taking all the disorder into account in the first order, the Hamiltonian for the full $0$-$\\pi$ circuit is:\n", "\\begin{align*}\n", - "H&= H_{\\theta,\\phi} + H_{\\zeta} + H_{\\text{int}}\\\\\n", - "H_{\\zeta}&= \\omega_\\zeta a^\\dagger a\\\\\n", - "H_{\\text{int}}&= 2E_{\\text C \\Sigma } dC \\partial_\\theta \\partial_\\eta + E_{\\text L} dE_{\\text L} \\phi\\zeta \n", + "H&= H_{\\theta,\\phi} + H_{\\zeta} + H_{\\text{int}},\\\\\n", + "H_{\\zeta}&= \\omega_\\zeta a^\\dagger a,\\\\\n", + "H_{\\text{int}}&= 2E_{\\text C \\Sigma } dC \\partial_\\theta \\partial_\\eta + E_{\\text L} dE_{\\text L} \\phi\\zeta,\n", "\\end{align*}\n", - "where $dC = 2(C_{1} - C_{2})/(C_{1}+C_{2})$ and $dL = 2(L_{1} - L_{2})/(L_{1}+L_{2})$.\n", + "where disorder in the capacitors and the inductors are defined as $dC = 2(C_{1} - C_{2})/(C_{1}+C_{2})$ and $dL = 2(L_{1} - L_{2})/(L_{1}+L_{2})$.\n", "\n", "
\n", "\n", @@ -503,13 +572,13 @@ }, { "cell_type": "code", - "execution_count": 18, + "execution_count": 34, "metadata": {}, "outputs": [ { "data": { "application/vnd.jupyter.widget-view+json": { - "model_id": "b31c431e5bd14401b8ca235555fa1188", + "model_id": "5db50ddfdbe149deabcfc988abb80e24", "version_major": 2, "version_minor": 0 }, @@ -523,7 +592,7 @@ { "data": { "application/vnd.jupyter.widget-view+json": { - "model_id": "8551f283de65468bbaf960b7288d62a7", + "model_id": "7dbef60d269244d79a3d544064252638", "version_major": 2, "version_minor": 0 }, @@ -541,14 +610,14 @@ }, { "cell_type": "code", - "execution_count": 5, + "execution_count": 35, "metadata": {}, "outputs": [ { "name": "stdout", "output_type": "stream", "text": [ - "FullZeroPi----------|\n", + "FullZeroPi----------| [FullZeroPi_1]\n", " | EJ: 10.0\n", " | EL: 0.04\n", " | ECJ: 20.0\n", @@ -578,13 +647,12 @@ "cell_type": "markdown", "metadata": {}, "source": [ - "Notice that four basis cutoffs need to be specified: `ncut`, `zeropi_cutoff`, `zeta_cutoff` and `grid`. The diagonalization of the full $0$-$\\pi$ is carried out in the following way: the $H_{\\theta,\\phi}$ is diagonalized under the hybrid basis which are specified by `ncut` and `grid`. The lowest `zeropi_cutoff` energy eigenstates are then used to formulate a set of basis with the lowest `zeta_cutoff` energy eigenstates of $H_{\\zeta}$, which describes a harmonic oscillator. Finally, the full Hamiltonian $H$ is represented under the composite basis and diagonalized." + "Notice that four basis cutoffs need to be specified: `ncut`, `zeropi_cutoff`, `zeta_cutoff` and `grid`. The full circuit is treated as a composite system made by subsystems with Hamiltonians $H_{\\theta, \\phi}$ and $H_\\zeta$, and their interactions $H_{\\text{int}}$. The diagonalization of the full $0$-$\\pi$ is carried out using hierarchical diagonalization with the following steps: \n", + "1. The symmetric $0$-$\\pi$ Hamiltonian $H_{\\theta,\\phi}$ is diagonalized using the hybrid basis; the basis is specified using `ncut` and `grid`.\n", + "2. The $\\zeta$-mode Hamiltonian $H_{\\zeta}$ is a harmonic oscillator Hamiltonian; its spectrum is obtained directly without performing numerical diagonalization.\n", + "3. From the resulting lowest energy eigenstates of $H_{\\theta,\\phi}$ and $H_\\zeta$, the lowest `zeropi_cutoff` and `zeta_cutoff` energy eigenstates of the respective subsystems are kept. A basis for the full circuit is obtained by taking tensor products of these subsystem eigenstates. \n", + "4. The full circuit Hamiltonian $H$ is represented under the above basis and diagonalized." ] - }, - { - "cell_type": "markdown", - "metadata": {}, - "source": [] } ], "metadata": { From 629d838b0b96340f5cf3fb98f6aa92f67fe0f63a Mon Sep 17 00:00:00 2001 From: pwndr3 Date: Fri, 5 May 2023 23:56:33 -0500 Subject: [PATCH 8/9] Various fixes and added some explanations for demo_hilbertspace --- examples/demo_hilbertspace.ipynb | 439 ++++++++++++++++++++++--------- 1 file changed, 313 insertions(+), 126 deletions(-) diff --git a/examples/demo_hilbertspace.ipynb b/examples/demo_hilbertspace.ipynb index 7c4a612..2c31875 100644 --- a/examples/demo_hilbertspace.ipynb +++ b/examples/demo_hilbertspace.ipynb @@ -1,6 +1,7 @@ { "cells": [ { + "attachments": {}, "cell_type": "markdown", "metadata": {}, "source": [ @@ -29,13 +30,11 @@ }, "outputs": [], "source": [ - "import scqubits as scq\n", - "\n", - "import numpy as np\n", - "import qutip as qt" + "import scqubits as scq" ] }, { + "attachments": {}, "cell_type": "markdown", "metadata": {}, "source": [ @@ -45,6 +44,7 @@ ] }, { + "attachments": {}, "cell_type": "markdown", "metadata": {}, "source": [ @@ -52,8 +52,11 @@ "\n", "As an interesting example of a coupled quantum system consider two harmonic modes coupled by an rf SQUID. The effective Hamiltonian describing this composite system, after integrating out the SQUID degrees of freedom, is given by [https://www.nature.com/articles/s41567-019-0703-5]\n", "\n", - "$\\displaystyle H/\\hbar = \\omega_a a^\\dagger a + \\omega_b b^\\dagger b + g(a^\\dagger b + a b^\\dagger) + g_2(a^\\dagger a^\\dagger b + a a b^\\dagger) + \\chi_{ab} a^\\dagger ab^\\dagger b + \\frac{\\chi_{aa}}{2} a^\\dagger a^\\dagger a a + \\frac{\\chi_{bb}}{2} b^\\dagger b^\\dagger b b$.\n", + "$\\displaystyle H/\\hbar = \\omega_a a^\\dagger a + \\omega_b b^\\dagger b + g(a^\\dagger b + a b^\\dagger) + g_2(a^\\dagger a^\\dagger b + a a b^\\dagger) + \\chi_{ab} a^\\dagger ab^\\dagger b + \\frac{\\chi_{aa}}{2} a^\\dagger a^\\dagger a a + \\frac{\\chi_{bb}}{2} b^\\dagger b^\\dagger b b$,\n", + "\n", + "which can be rewritten as\n", "\n", + "$\\displaystyle H = E_{\\text{osc}_a} a^\\dagger a + E_{\\text{osc}_b} b^\\dagger b + g(a^\\dagger b + a b^\\dagger) + g_2(a^\\dagger a^\\dagger b + a a b^\\dagger) + \\chi_{ab} a^\\dagger ab^\\dagger b - K_a a^\\dagger a^\\dagger a a - K_b b^\\dagger b^\\dagger b b$.\n", "\n", "### Define Hilbert space components, initialize `HilbertSpace` object\n", "\n", @@ -75,17 +78,22 @@ "outputs": [], "source": [ "# Set up the components / subspaces of our Hilbert space\n", + "E_osc_a = 4.284\n", + "K_a = 0.003\n", + "\n", + "E_osc_b = 7.073\n", + "K_b = 0.015\n", "\n", "osc1 = scq.KerrOscillator(\n", - " E_osc = 4.284,\n", - " K = 0.003,\n", + " E_osc = E_osc_a,\n", + " K = K_a,\n", " l_osc = 1,\n", " truncated_dim = 4,\n", ")\n", "\n", "osc2 = scq.KerrOscillator(\n", - " E_osc = 7.073,\n", - " K = 0.015,\n", + " E_osc = E_osc_b,\n", + " K = K_b,\n", " l_osc = 1,\n", " truncated_dim = 4,\n", ")\n", @@ -137,6 +145,7 @@ ] }, { + "attachments": {}, "cell_type": "markdown", "metadata": { "pycharm": { @@ -163,7 +172,7 @@ { "data": { "text/latex": [ - "Quantum object: dims = [[4, 4], [4, 4]], shape = (16, 16), type = oper, isherm = True\\begin{equation*}\\left(\\begin{array}{*{11}c}0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 7.073 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.0 & 14.116 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.0 & 0.0 & 21.129 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 4.284 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\\\vdots & \\vdots & \\vdots & \\vdots & \\vdots & \\ddots & \\vdots & \\vdots & \\vdots & \\vdots & \\vdots\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 29.691 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 12.834 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 19.907 & 0.0 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 26.950 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 33.963\\\\\\end{array}\\right)\\end{equation*}" + "Quantum object: dims = [[4, 4], [4, 4]], shape = (16, 16), type = oper, isherm = True $ \\\\ \\left(\\begin{matrix}0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 7.073 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.0 & 14.116 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.0 & 0.0 & 21.129 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 4.284 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\\\vdots & \\vdots & \\vdots & \\vdots & \\vdots & \\ddots & \\vdots & \\vdots & \\vdots & \\vdots & \\vdots\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 29.691 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 12.834 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 19.907 & 0.0 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 26.950 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 33.963\\\\\\end{matrix}\\right)$" ], "text/plain": [ "Quantum object: dims = [[4, 4], [4, 4]], shape = (16, 16), type = oper, isherm = True\n", @@ -213,6 +222,35 @@ ] }, { + "attachments": {}, + "cell_type": "markdown", + "metadata": {}, + "source": [ + "As we have not added any interactions yet, there is no difference between the methods `bare_hamiltonian()` and `hamiltonian()` at the moment:" + ] + }, + { + "cell_type": "code", + "execution_count": 5, + "metadata": {}, + "outputs": [ + { + "data": { + "text/plain": [ + "True" + ] + }, + "execution_count": 5, + "metadata": {}, + "output_type": "execute_result" + } + ], + "source": [ + "bare_hamiltonian == hilbertspace.hamiltonian()" + ] + }, + { + "attachments": {}, "cell_type": "markdown", "metadata": { "pycharm": { @@ -225,6 +263,7 @@ ] }, { + "attachments": {}, "cell_type": "markdown", "metadata": { "pycharm": { @@ -232,10 +271,13 @@ } }, "source": [ - "### Set up interaction terms between individual subsystems" + "### Set up interaction terms between individual subsystems\n", + "\n", + "Interactions are added using the `add_interaction()` method. If the interaction is of the form $g \\cdot \\text{op1} \\cdot \\text{op2}$, it can be added by specifying the coefficient $g$ and the two operators $\\text{op1}$ and $\\text{op2}$. Otherwise, the interaction is given as a Python string that is later evaluated." ] }, { + "attachments": {}, "cell_type": "markdown", "metadata": {}, "source": [ @@ -246,7 +288,7 @@ }, { "cell_type": "code", - "execution_count": 5, + "execution_count": 6, "metadata": { "ExecuteTime": { "end_time": "2020-03-31T11:44:00.099411Z", @@ -258,9 +300,8 @@ }, "outputs": [], "source": [ - "# Term 1\n", "# Option A: operator product specification via callables\n", - "\n", + "# Term 1\n", "g = 0.1\n", "\n", "hilbertspace.add_interaction(\n", @@ -270,34 +311,30 @@ " add_hc = True\n", ")\n", "\n", - "\n", - "# Term 2\n", "# Option B: string-based specification of interaction term\n", - "\n", + "# Term 2\n", "g2 = 0.035 \n", "\n", "hilbertspace.add_interaction(\n", - " expr = \"g2 * (adag * adag * b)\",\n", - " op1 = (\"adag\", osc1.creation_operator),\n", + " expr = \"g2 * a.dag() * a.dag() * b\",\n", + " op1 = (\"a\", osc1.annihilation_operator),\n", " op2 = (\"b\", osc2.annihilation_operator),\n", " add_hc = True\n", ")\n", "\n", - "\n", "# Term 3\n", - "\n", "chi_ab = 0.01\n", "\n", "hilbertspace.add_interaction(\n", - " expr = \"chi_ab * a.dag() * a.dag() * b.dag() * b\",\n", + " expr = \"chi_ab * a.dag() * a * b.dag() * b\",\n", " op1 = (\"a\", osc1.annihilation_operator),\n", " op2 = (\"b\", osc2.annihilation_operator),\n", - " add_hc = True\n", - ")\n", - "\n" + " add_hc = False\n", + ")" ] }, { + "attachments": {}, "cell_type": "markdown", "metadata": { "pycharm": { @@ -305,12 +342,12 @@ } }, "source": [ - "Now that the interactions are specified, the full Hamiltonian of the coupled system can be obtained via:" + "Now that the interactions are specified, the full Hamiltonian of the coupled system can be obtained with `hamiltonian()`:" ] }, { "cell_type": "code", - "execution_count": 6, + "execution_count": 7, "metadata": { "ExecuteTime": { "end_time": "2020-03-31T11:44:03.627440Z", @@ -324,78 +361,62 @@ { "data": { "text/latex": [ - "Quantum object: dims = [[4, 4], [4, 4]], shape = (16, 16), type = oper, isherm = True\\begin{equation*}\\left(\\begin{array}{*{11}c}0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 7.073 & 0.0 & 0.0 & 0.100 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.0 & 14.116 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.0 & 0.0 & 21.129 & 0.0 & \\cdots & 0.042 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.100 & 0.0 & 0.0 & 4.284 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\\\vdots & \\vdots & \\vdots & \\vdots & \\vdots & \\ddots & \\vdots & \\vdots & \\vdots & \\vdots & \\vdots\\\\0.0 & 0.0 & 0.0 & 0.042 & 0.0 & \\cdots & 29.691 & 0.0 & 0.0 & 0.300 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 12.834 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 19.907 & 0.0 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.300 & 0.0 & 0.0 & 26.950 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 33.963\\\\\\end{array}\\right)\\end{equation*}" + "Quantum object: dims = [[4, 4], [4, 4]], shape = (16, 16), type = oper, isherm = True $ \\\\ \\left(\\begin{matrix}0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 7.073 & 0.0 & 0.0 & 0.100 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.0 & 14.116 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.0 & 0.0 & 21.129 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.100 & 0.0 & 0.0 & 4.284 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\\\vdots & \\vdots & \\vdots & \\vdots & \\vdots & \\ddots & \\vdots & \\vdots & \\vdots & \\vdots & \\vdots\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 29.751 & 0.0 & 0.0 & 0.300 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 12.834 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 19.937 & 0.0 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.300 & 0.0 & 0.0 & 27.010 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 34.053\\\\\\end{matrix}\\right)$" ], "text/plain": [ "Quantum object: dims = [[4, 4], [4, 4]], shape = (16, 16), type = oper, isherm = True\n", "Qobj data =\n", - "[[0.00000000e+00 0.00000000e+00 0.00000000e+00 0.00000000e+00\n", - " 0.00000000e+00 0.00000000e+00 0.00000000e+00 0.00000000e+00\n", - " 0.00000000e+00 0.00000000e+00 0.00000000e+00 0.00000000e+00\n", - " 0.00000000e+00 0.00000000e+00 0.00000000e+00 0.00000000e+00]\n", - " [0.00000000e+00 7.07300000e+00 0.00000000e+00 0.00000000e+00\n", - " 1.00000000e-01 0.00000000e+00 0.00000000e+00 0.00000000e+00\n", - " 4.94974747e-02 1.41421356e-02 0.00000000e+00 0.00000000e+00\n", - " 0.00000000e+00 0.00000000e+00 0.00000000e+00 0.00000000e+00]\n", - " [0.00000000e+00 0.00000000e+00 1.41160000e+01 0.00000000e+00\n", - " 0.00000000e+00 1.41421356e-01 0.00000000e+00 0.00000000e+00\n", - " 0.00000000e+00 7.00000000e-02 2.82842712e-02 0.00000000e+00\n", - " 0.00000000e+00 0.00000000e+00 0.00000000e+00 0.00000000e+00]\n", - " [0.00000000e+00 0.00000000e+00 0.00000000e+00 2.11290000e+01\n", - " 0.00000000e+00 0.00000000e+00 1.73205081e-01 0.00000000e+00\n", - " 0.00000000e+00 0.00000000e+00 8.57321410e-02 4.24264069e-02\n", - " 0.00000000e+00 0.00000000e+00 0.00000000e+00 0.00000000e+00]\n", - " [0.00000000e+00 1.00000000e-01 0.00000000e+00 0.00000000e+00\n", - " 4.28400000e+00 0.00000000e+00 0.00000000e+00 0.00000000e+00\n", - " 0.00000000e+00 0.00000000e+00 0.00000000e+00 0.00000000e+00\n", - " 0.00000000e+00 0.00000000e+00 0.00000000e+00 0.00000000e+00]\n", - " [0.00000000e+00 0.00000000e+00 1.41421356e-01 0.00000000e+00\n", - " 0.00000000e+00 1.13570000e+01 0.00000000e+00 0.00000000e+00\n", - " 1.41421356e-01 0.00000000e+00 0.00000000e+00 0.00000000e+00\n", - " 8.57321410e-02 2.44948974e-02 0.00000000e+00 0.00000000e+00]\n", - " [0.00000000e+00 0.00000000e+00 0.00000000e+00 1.73205081e-01\n", - " 0.00000000e+00 0.00000000e+00 1.84000000e+01 0.00000000e+00\n", - " 0.00000000e+00 2.00000000e-01 0.00000000e+00 0.00000000e+00\n", - " 0.00000000e+00 1.21243557e-01 4.89897949e-02 0.00000000e+00]\n", - " [0.00000000e+00 0.00000000e+00 0.00000000e+00 0.00000000e+00\n", - " 0.00000000e+00 0.00000000e+00 0.00000000e+00 2.54130000e+01\n", - " 0.00000000e+00 0.00000000e+00 2.44948974e-01 0.00000000e+00\n", - " 0.00000000e+00 0.00000000e+00 1.48492424e-01 7.34846923e-02]\n", - " [0.00000000e+00 4.94974747e-02 0.00000000e+00 0.00000000e+00\n", - " 0.00000000e+00 1.41421356e-01 0.00000000e+00 0.00000000e+00\n", - " 8.56200000e+00 0.00000000e+00 0.00000000e+00 0.00000000e+00\n", - " 0.00000000e+00 0.00000000e+00 0.00000000e+00 0.00000000e+00]\n", - " [0.00000000e+00 1.41421356e-02 7.00000000e-02 0.00000000e+00\n", - " 0.00000000e+00 0.00000000e+00 2.00000000e-01 0.00000000e+00\n", - " 0.00000000e+00 1.56350000e+01 0.00000000e+00 0.00000000e+00\n", - " 1.73205081e-01 0.00000000e+00 0.00000000e+00 0.00000000e+00]\n", - " [0.00000000e+00 0.00000000e+00 2.82842712e-02 8.57321410e-02\n", - " 0.00000000e+00 0.00000000e+00 0.00000000e+00 2.44948974e-01\n", - " 0.00000000e+00 0.00000000e+00 2.26780000e+01 0.00000000e+00\n", - " 0.00000000e+00 2.44948974e-01 0.00000000e+00 0.00000000e+00]\n", - " [0.00000000e+00 0.00000000e+00 0.00000000e+00 4.24264069e-02\n", - " 0.00000000e+00 0.00000000e+00 0.00000000e+00 0.00000000e+00\n", - " 0.00000000e+00 0.00000000e+00 0.00000000e+00 2.96910000e+01\n", - " 0.00000000e+00 0.00000000e+00 3.00000000e-01 0.00000000e+00]\n", - " [0.00000000e+00 0.00000000e+00 0.00000000e+00 0.00000000e+00\n", - " 0.00000000e+00 8.57321410e-02 0.00000000e+00 0.00000000e+00\n", - " 0.00000000e+00 1.73205081e-01 0.00000000e+00 0.00000000e+00\n", - " 1.28340000e+01 0.00000000e+00 0.00000000e+00 0.00000000e+00]\n", - " [0.00000000e+00 0.00000000e+00 0.00000000e+00 0.00000000e+00\n", - " 0.00000000e+00 2.44948974e-02 1.21243557e-01 0.00000000e+00\n", - " 0.00000000e+00 0.00000000e+00 2.44948974e-01 0.00000000e+00\n", - " 0.00000000e+00 1.99070000e+01 0.00000000e+00 0.00000000e+00]\n", - " [0.00000000e+00 0.00000000e+00 0.00000000e+00 0.00000000e+00\n", - " 0.00000000e+00 0.00000000e+00 4.89897949e-02 1.48492424e-01\n", - " 0.00000000e+00 0.00000000e+00 0.00000000e+00 3.00000000e-01\n", - " 0.00000000e+00 0.00000000e+00 2.69500000e+01 0.00000000e+00]\n", - " [0.00000000e+00 0.00000000e+00 0.00000000e+00 0.00000000e+00\n", - " 0.00000000e+00 0.00000000e+00 0.00000000e+00 7.34846923e-02\n", - " 0.00000000e+00 0.00000000e+00 0.00000000e+00 0.00000000e+00\n", - " 0.00000000e+00 0.00000000e+00 0.00000000e+00 3.39630000e+01]]" + "[[ 0. 0. 0. 0. 0. 0.\n", + " 0. 0. 0. 0. 0. 0.\n", + " 0. 0. 0. 0. ]\n", + " [ 0. 7.073 0. 0. 0.1 0.\n", + " 0. 0. 0.04949747 0. 0. 0.\n", + " 0. 0. 0. 0. ]\n", + " [ 0. 0. 14.116 0. 0. 0.14142136\n", + " 0. 0. 0. 0.07 0. 0.\n", + " 0. 0. 0. 0. ]\n", + " [ 0. 0. 0. 21.129 0. 0.\n", + " 0.17320508 0. 0. 0. 0.08573214 0.\n", + " 0. 0. 0. 0. ]\n", + " [ 0. 0.1 0. 0. 4.284 0.\n", + " 0. 0. 0. 0. 0. 0.\n", + " 0. 0. 0. 0. ]\n", + " [ 0. 0. 0.14142136 0. 0. 11.367\n", + " 0. 0. 0.14142136 0. 0. 0.\n", + " 0.08573214 0. 0. 0. ]\n", + " [ 0. 0. 0. 0.17320508 0. 0.\n", + " 18.42 0. 0. 0.2 0. 0.\n", + " 0. 0.12124356 0. 0. ]\n", + " [ 0. 0. 0. 0. 0. 0.\n", + " 0. 25.443 0. 0. 0.24494897 0.\n", + " 0. 0. 0.14849242 0. ]\n", + " [ 0. 0.04949747 0. 0. 0. 0.14142136\n", + " 0. 0. 8.562 0. 0. 0.\n", + " 0. 0. 0. 0. ]\n", + " [ 0. 0. 0.07 0. 0. 0.\n", + " 0.2 0. 0. 15.655 0. 0.\n", + " 0.17320508 0. 0. 0. ]\n", + " [ 0. 0. 0. 0.08573214 0. 0.\n", + " 0. 0.24494897 0. 0. 22.718 0.\n", + " 0. 0.24494897 0. 0. ]\n", + " [ 0. 0. 0. 0. 0. 0.\n", + " 0. 0. 0. 0. 0. 29.751\n", + " 0. 0. 0.3 0. ]\n", + " [ 0. 0. 0. 0. 0. 0.08573214\n", + " 0. 0. 0. 0.17320508 0. 0.\n", + " 12.834 0. 0. 0. ]\n", + " [ 0. 0. 0. 0. 0. 0.\n", + " 0.12124356 0. 0. 0. 0.24494897 0.\n", + " 0. 19.937 0. 0. ]\n", + " [ 0. 0. 0. 0. 0. 0.\n", + " 0. 0.14849242 0. 0. 0. 0.3\n", + " 0. 0. 27.01 0. ]\n", + " [ 0. 0. 0. 0. 0. 0.\n", + " 0. 0. 0. 0. 0. 0.\n", + " 0. 0. 0. 34.053 ]]" ] }, - "execution_count": 6, + "execution_count": 7, "metadata": {}, "output_type": "execute_result" } @@ -406,15 +427,16 @@ ] }, { + "attachments": {}, "cell_type": "markdown", "metadata": {}, "source": [ - "Since the composite Hamiltonian is a `qutip.Qobj`, The eigenvalues and eigenvectors can be now be obtained via the usual QuTiP routine:" + "Since the composite Hamiltonian is a `qutip.Qobj`, the eigenvalues and eigenvectors can be now be obtained via the usual QuTiP routine:" ] }, { "cell_type": "code", - "execution_count": 7, + "execution_count": 8, "metadata": { "ExecuteTime": { "end_time": "2020-03-31T11:44:06.327709Z", @@ -426,7 +448,7 @@ "name": "stdout", "output_type": "stream", "text": [ - "[0. 4.28041833 7.07490698 8.55649874]\n" + "[0. 4.28041835 7.07493032 8.55652435]\n" ] } ], @@ -436,6 +458,7 @@ ] }, { + "attachments": {}, "cell_type": "markdown", "metadata": {}, "source": [ @@ -446,13 +469,13 @@ }, { "cell_type": "code", - "execution_count": 8, + "execution_count": 9, "metadata": {}, "outputs": [ { "data": { "application/vnd.jupyter.widget-view+json": { - "model_id": "4f61820ee28a477380e0effac8f610d3", + "model_id": "ef0a6e2406774362a1bd2494ab4eef17", "version_major": 2, "version_minor": 0 }, @@ -466,7 +489,7 @@ { "data": { "application/vnd.jupyter.widget-view+json": { - "model_id": "4d283e99e02f47ea9ec35101f5bc5796", + "model_id": "502a89ee55c443118049e3440fed57d2", "version_major": 2, "version_minor": 0 }, @@ -479,21 +502,181 @@ } ], "source": [ - "hilbertspace_new = scq.HilbertSpace.create()" + "hilbertspace_gui = scq.HilbertSpace.create()" + ] + }, + { + "cell_type": "code", + "execution_count": 10, + "metadata": {}, + "outputs": [ + { + "name": "stdout", + "output_type": "stream", + "text": [ + "HilbertSpace: subsystems\n", + "-------------------------\n", + "\n", + "KerrOscillator------| [KerrOscillator_1]\n", + " | E_osc: 4.284\n", + " | K: 0.003\n", + " | l_osc: 1\n", + " | truncated_dim: 4\n", + " |\n", + " | dim: 4\n", + "\n", + "\n", + "KerrOscillator------| [KerrOscillator_2]\n", + " | E_osc: 7.073\n", + " | K: 0.015\n", + " | l_osc: 1\n", + " | truncated_dim: 4\n", + " |\n", + " | dim: 4\n", + "\n", + "\n", + "\n", + "HilbertSpace: interaction terms\n", + "--------------------------------\n", + "InteractionTerm----------| [InteractionTerm_0]\n", + " | expr: 'g * op1 * op2'\n", + " | operator_list: [(0, 'op1', array([[0. , 0. , 0. ...\n", + " | const: {}\n", + " | add_hc: True\n", + "\n", + "InteractionTerm----------| [InteractionTerm_1]\n", + " | expr: 'g2 * op1.dag() * op1.dag() * op2'\n", + " | operator_list: [(0, 'op1', array([[0. , 1. , 0. ...\n", + " | const: {}\n", + " | add_hc: True\n", + "\n", + "InteractionTerm----------| [InteractionTerm_2]\n", + " | expr: 'chi_ab * op1.dag() * op1 * op2.dag() * op2'\n", + " | operator_list: [(0, 'op1', array([[0. , 1. , 0. ...\n", + " | const: {}\n", + " | add_hc: False\n", + "\n", + "\n" + ] + } + ], + "source": [ + "print(hilbertspace_gui)" + ] + }, + { + "cell_type": "code", + "execution_count": 11, + "metadata": {}, + "outputs": [ + { + "data": { + "text/latex": [ + "Quantum object: dims = [[4, 4], [4, 4]], shape = (16, 16), type = oper, isherm = True $ \\\\ \\left(\\begin{matrix}0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 7.073 & 0.0 & 0.0 & 0.100 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.0 & 14.116 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.0 & 0.0 & 21.129 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.100 & 0.0 & 0.0 & 4.284 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 0.0\\\\\\vdots & \\vdots & \\vdots & \\vdots & \\vdots & \\ddots & \\vdots & \\vdots & \\vdots & \\vdots & \\vdots\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 29.751 & 0.0 & 0.0 & 0.300 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 12.834 & 0.0 & 0.0 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 19.937 & 0.0 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.300 & 0.0 & 0.0 & 27.010 & 0.0\\\\0.0 & 0.0 & 0.0 & 0.0 & 0.0 & \\cdots & 0.0 & 0.0 & 0.0 & 0.0 & 34.053\\\\\\end{matrix}\\right)$" + ], + "text/plain": [ + "Quantum object: dims = [[4, 4], [4, 4]], shape = (16, 16), type = oper, isherm = True\n", + "Qobj data =\n", + "[[ 0. 0. 0. 0. 0. 0.\n", + " 0. 0. 0. 0. 0. 0.\n", + " 0. 0. 0. 0. ]\n", + " [ 0. 7.073 0. 0. 0.1 0.\n", + " 0. 0. 0.04949747 0. 0. 0.\n", + " 0. 0. 0. 0. ]\n", + " [ 0. 0. 14.116 0. 0. 0.14142136\n", + " 0. 0. 0. 0.07 0. 0.\n", + " 0. 0. 0. 0. ]\n", + " [ 0. 0. 0. 21.129 0. 0.\n", + " 0.17320508 0. 0. 0. 0.08573214 0.\n", + " 0. 0. 0. 0. ]\n", + " [ 0. 0.1 0. 0. 4.284 0.\n", + " 0. 0. 0. 0. 0. 0.\n", + " 0. 0. 0. 0. ]\n", + " [ 0. 0. 0.14142136 0. 0. 11.367\n", + " 0. 0. 0.14142136 0. 0. 0.\n", + " 0.08573214 0. 0. 0. ]\n", + " [ 0. 0. 0. 0.17320508 0. 0.\n", + " 18.42 0. 0. 0.2 0. 0.\n", + " 0. 0.12124356 0. 0. ]\n", + " [ 0. 0. 0. 0. 0. 0.\n", + " 0. 25.443 0. 0. 0.24494897 0.\n", + " 0. 0. 0.14849242 0. ]\n", + " [ 0. 0.04949747 0. 0. 0. 0.14142136\n", + " 0. 0. 8.562 0. 0. 0.\n", + " 0. 0. 0. 0. ]\n", + " [ 0. 0. 0.07 0. 0. 0.\n", + " 0.2 0. 0. 15.655 0. 0.\n", + " 0.17320508 0. 0. 0. ]\n", + " [ 0. 0. 0. 0.08573214 0. 0.\n", + " 0. 0.24494897 0. 0. 22.718 0.\n", + " 0. 0.24494897 0. 0. ]\n", + " [ 0. 0. 0. 0. 0. 0.\n", + " 0. 0. 0. 0. 0. 29.751\n", + " 0. 0. 0.3 0. ]\n", + " [ 0. 0. 0. 0. 0. 0.08573214\n", + " 0. 0. 0. 0.17320508 0. 0.\n", + " 12.834 0. 0. 0. ]\n", + " [ 0. 0. 0. 0. 0. 0.\n", + " 0.12124356 0. 0. 0. 0.24494897 0.\n", + " 0. 19.937 0. 0. ]\n", + " [ 0. 0. 0. 0. 0. 0.\n", + " 0. 0.14849242 0. 0. 0. 0.3\n", + " 0. 0. 27.01 0. ]\n", + " [ 0. 0. 0. 0. 0. 0.\n", + " 0. 0. 0. 0. 0. 0.\n", + " 0. 0. 0. 34.053 ]]" + ] + }, + "execution_count": 11, + "metadata": {}, + "output_type": "execute_result" + } + ], + "source": [ + "hilbertspace_gui.hamiltonian()" ] }, { + "attachments": {}, + "cell_type": "markdown", + "metadata": {}, + "source": [ + "We can see that it indeed corresponds to the Hamiltonian created programatically:" + ] + }, + { + "cell_type": "code", + "execution_count": 12, + "metadata": {}, + "outputs": [ + { + "data": { + "text/plain": [ + "True" + ] + }, + "execution_count": 12, + "metadata": {}, + "output_type": "execute_result" + } + ], + "source": [ + "hilbertspace_gui.hamiltonian() == dressed_hamiltonian" + ] + }, + { + "attachments": {}, "cell_type": "markdown", "metadata": {}, "source": [ "### Spectrum lookup and converting between bare and dressed indices\n", "\n", - "To use lookup functions for state indices, energies and states, first generate the lookup table via:" + "In the dispersive regime where bare states don't hybridize too much, it may be useful to convert between dressed states and their closest product bare states as physical interpretation may be easier. To use lookup functions for state indices, energies and states, first generate the lookup table via `generate_lookup()`:" ] }, { "cell_type": "code", - "execution_count": 9, + "execution_count": 13, "metadata": { "ExecuteTime": { "end_time": "2020-03-31T11:44:10.103117Z", @@ -506,15 +689,16 @@ ] }, { + "attachments": {}, "cell_type": "markdown", "metadata": {}, "source": [ - "Here are the bare energies of the first Kerr oscillator:" + "We can first print the bare energies of the two Kerr oscillators:" ] }, { "cell_type": "code", - "execution_count": 12, + "execution_count": 14, "metadata": { "ExecuteTime": { "end_time": "2020-03-31T11:44:13.722890Z", @@ -523,30 +707,30 @@ }, "outputs": [ { - "data": { - "text/plain": [ - "array([ 0. , 4.284, 8.562, 12.834])" - ] - }, - "execution_count": 12, - "metadata": {}, - "output_type": "execute_result" + "name": "stdout", + "output_type": "stream", + "text": [ + "[ 0. 4.284 8.562 12.834]\n", + "[ 0. 7.073 14.116 21.129]\n" + ] } ], "source": [ - "hilbertspace.bare_eigenvals(osc1)" + "print(hilbertspace.bare_eigenvals(osc1))\n", + "print(hilbertspace.bare_eigenvals(osc2))" ] }, { + "attachments": {}, "cell_type": "markdown", "metadata": {}, "source": [ - "The dressed state with index j=8 corresponds to following bare product state:" + "Next, we can lookup the closest bare product state to the dressed state with index `8` with `bare_index()`, which corresponds to 1 excitation in the first Kerr oscillator and 2 excitations in the second." ] }, { "cell_type": "code", - "execution_count": 13, + "execution_count": 15, "metadata": { "ExecuteTime": { "end_time": "2020-03-31T11:44:16.331869Z", @@ -560,7 +744,7 @@ "(1, 2)" ] }, - "execution_count": 13, + "execution_count": 15, "metadata": {}, "output_type": "execute_result" } @@ -570,15 +754,16 @@ ] }, { + "attachments": {}, "cell_type": "markdown", "metadata": {}, "source": [ - "And the bare product state (2,1) most closely matches the following dressed state:" + "Conversely, we can verify that the bare product state (1,2) most closely matches the dressed state with index `8`" ] }, { "cell_type": "code", - "execution_count": 15, + "execution_count": 16, "metadata": { "ExecuteTime": { "end_time": "2020-03-31T11:44:19.844481Z", @@ -589,23 +774,24 @@ { "data": { "text/plain": [ - "7" + "8" ] }, - "execution_count": 15, + "execution_count": 16, "metadata": {}, "output_type": "execute_result" } ], "source": [ - "hilbertspace.dressed_index((2,1))" + "hilbertspace.dressed_index((1,2))" ] }, { + "attachments": {}, "cell_type": "markdown", "metadata": {}, "source": [ - "This is the eigenenergy for dressed index j=10:" + "Finally, we can get the eigenenergy for dressed index `8` using `energy_by_dressed_index()`:" ] }, { @@ -621,7 +807,7 @@ { "data": { "text/plain": [ - "21.135009003451163" + "18.413688985491895" ] }, "execution_count": 17, @@ -630,16 +816,17 @@ } ], "source": [ - "hilbertspace.energy_by_dressed_index(10)" + "hilbertspace.energy_by_dressed_index(8)" ] }, { + "attachments": {}, "cell_type": "markdown", "metadata": {}, "source": [ "## Sweeping over an external parameter\n", "\n", - "scqubits provides the class `ParameterSweep` to facilitate computation of spectra as function of an external parameter. See the example notebook for `ParameterSweep` to explore sweeps and visualizing sweep data." + "Equipped with a programmatic interface to explore interactions between subsystems, scqubits provides the class `ParameterSweep` to facilitate computation of spectra as function of an external parameter. See the [example notebook](./demo_parametersweep.ipynb) for `ParameterSweep` to explore sweeps and visualizing sweep data." ] } ], @@ -660,7 +847,7 @@ "name": "python", "nbconvert_exporter": "python", "pygments_lexer": "ipython3", - "version": "3.9.15" + "version": "3.11.2" }, "toc": { "base_numbering": 1, From cfa229e2b5aabee6858830e6c4244e959127b2db Mon Sep 17 00:00:00 2001 From: pwndr3 Date: Tue, 9 May 2023 21:47:58 -0500 Subject: [PATCH 9/9] Remove l_osc=1 as it's not necessary/used here --- examples/demo_hilbertspace.ipynb | 16 +++++++--------- 1 file changed, 7 insertions(+), 9 deletions(-) diff --git a/examples/demo_hilbertspace.ipynb b/examples/demo_hilbertspace.ipynb index 2c31875..9175efd 100644 --- a/examples/demo_hilbertspace.ipynb +++ b/examples/demo_hilbertspace.ipynb @@ -87,14 +87,12 @@ "osc1 = scq.KerrOscillator(\n", " E_osc = E_osc_a,\n", " K = K_a,\n", - " l_osc = 1,\n", " truncated_dim = 4,\n", ")\n", "\n", "osc2 = scq.KerrOscillator(\n", " E_osc = E_osc_b,\n", " K = K_b,\n", - " l_osc = 1,\n", " truncated_dim = 4,\n", ")\n", "\n", @@ -122,7 +120,7 @@ "KerrOscillator------| [KerrOscillator_1]\n", " | E_osc: 4.284\n", " | K: 0.003\n", - " | l_osc: 1\n", + " | l_osc: None\n", " | truncated_dim: 4\n", " |\n", " | dim: 4\n", @@ -131,7 +129,7 @@ "KerrOscillator------| [KerrOscillator_2]\n", " | E_osc: 7.073\n", " | K: 0.015\n", - " | l_osc: 1\n", + " | l_osc: None\n", " | truncated_dim: 4\n", " |\n", " | dim: 4\n", @@ -475,7 +473,7 @@ { "data": { "application/vnd.jupyter.widget-view+json": { - "model_id": "ef0a6e2406774362a1bd2494ab4eef17", + "model_id": "f3f947cb87bf4b198948a37ee4bee782", "version_major": 2, "version_minor": 0 }, @@ -489,7 +487,7 @@ { "data": { "application/vnd.jupyter.widget-view+json": { - "model_id": "502a89ee55c443118049e3440fed57d2", + "model_id": "2ffb1a622bac411199662b5548b04746", "version_major": 2, "version_minor": 0 }, @@ -520,7 +518,7 @@ "KerrOscillator------| [KerrOscillator_1]\n", " | E_osc: 4.284\n", " | K: 0.003\n", - " | l_osc: 1\n", + " | l_osc: None\n", " | truncated_dim: 4\n", " |\n", " | dim: 4\n", @@ -529,7 +527,7 @@ "KerrOscillator------| [KerrOscillator_2]\n", " | E_osc: 7.073\n", " | K: 0.015\n", - " | l_osc: 1\n", + " | l_osc: None\n", " | truncated_dim: 4\n", " |\n", " | dim: 4\n", @@ -847,7 +845,7 @@ "name": "python", "nbconvert_exporter": "python", "pygments_lexer": "ipython3", - "version": "3.11.2" + "version": "3.11.3" }, "toc": { "base_numbering": 1,