Simulations about various surface growth models
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Updated
Mar 5, 2017 - Jupyter Notebook
Simulations about various surface growth models
A classic implementation in C++ of the famous 2D Ising Model.
🔴 Monte Carlo Event Chain Python Module
1DPIMC: Path Integral Quantum Monte-Carlo simulation of one-dimensional many body particle system.
Contains python codes/notebooks for a machine learning review
Supplemental material for the article "Variable Order Fractional Fokker-Planck Equations derived from Continuous Time Random Walks"
Code developed for a research project at Umeå universitet focusing on sheared packings of ellipsoids, supervised by Peter Olsson.
Optimizing Low Autocorrelation Binary Sequences (LABS)
Software for inferring the intrinsic fitness landscape of poliovirus capsid protein (vp1) and comparing it with that of analogous proteins in HIV
Python little library to simulate nanoscale hat transport from the Gray Model approach.
2D Ising model in a square lattice with Metropolis-Hastings algorithm and sequential update.
Gas simulation with graphical PyQt5 interface. It can simulate either an ideal or real gas and calculate some of its properties as the thermodynamic pressure, the particle velocity distribution, etc. It can also simulate some thermodynamics processes like an isothermal expansion or isochoric heating and calculate the compressibility.
Python library and Julia scripts to simulate several Flexible Chain Walker (FCW) models.
Jupyter Notebook tab and raw Julia script to simulate the Phi-4 model in a square lattice (d=2) .
Numerical integration of mean-field equations for large-scale leaky integrate-and-fire neuronal network simulations incorporating synaptic plasticity via Graupner Brunel model. Includes support for a memory-induction stim-pop.
Forced ratched model of molecular motor
Forced ratched model of molecular motors.
Notes of a research project at Umeå universitet focusing on sheared packings of ellipsoids, supervised by Peter Olsson.
Markov chain Monte Carlo for topological phase transitions
Data, codes and script for a paper on Theory of the Canonical Ensemble
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