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ePICURE

Python Isogeometric CUrve REconstruction

This is the final project for the course Applied Mathematics: an Introduction to Numerical Analysis and Sientific Computing. It consists of several small sub-projects, that will combine together in an open source software for curve resconstruction, analysis and simulation. We will apply this to micro-swimming problems, but several other applications are possible...

The students should be familiar with

  • Interpolation
  • Integration
  • Direct and iterative solution of linear systems
  • Solution of non-linear systems
  • Systems of Ordinary Differential Equations (ODEs)
  • Finite difference and Galerkin methods
  • Git

Objects

At each time frame, an object can be described by

  • m numbers (maximum 6), maximum three for the location, and maximum three for the rotation, describing the global position (location and rotation) of the object

  • a collection of n numbers, describing the local shape of the object. Examples are:

    • a collection of points, describing a curve
    • a collection of points, describing a mesh
    • a collection local locations and rotations, describing assemblies of rigid bodies
    • use your imagination!

The full time dependent evolution of an object (a stroke) is described by a curve in time for each of the numbers above (a path). The time curves are polynomial curves, or NURBS curves. In any case, they can be described by coefficients times basis functions.

Short Instructions for contributions

Each contribution should be done on a feature branch of a forked repository, then a pull request should be issued, which will be merged by me on mainline. Take a look at this page for a very good explanation on possible git workflows: https://www.atlassian.com/git/tutorials/comparing-workflows/. We will be adopting the forking workflow:

  • Fork the official repository (server side cloning) using the fork button on github

  • Clone your fork onto your PC (it remains yours)

      git clone  https://github.com/your-user-name/ePICURE.git
    
  • Add the following master remote to your clone::

      cd ePICURE
      git remote add heltai https://github.com/luca-heltai/ePICURE.git
    
  • Make a feature branch on your PC

      git checkout heltai/master -b a_significant_name_for_your_feature
    
  • commit, add tests, fix bugs, push your changes to the server, etc. When you push, make sure you push to your remote (origin)

      git push origin a_significant_name_for_your_feature
    
  • when you think your contribution is ready (a contribution is usually one single feature with one test) do the following:

    • rebase interactively (-i switch) your changes onto the master branch of the remote heltai, after updating your local branches:

        # Get all changes from all remote repositories
        git fetch --all
        git rebase -i heltai/master
      
    • the above command will pop up an editor in which you will be allowed to make squash all your commits into a couple, more significant, commits. Push your changes by forcing the push (you have just changed history, so this will be allowed only if you force your changes)

        git push -f origin a_significant_name_for_your_feature
      
  • go to github web site, select the branch you have been working on, and hit the button compare and pull request

  • once I have reviewed your code, I will accept it an put it in the master branch

Components that should be implemented

Each component should have a well documented interface. An example is given for the VectorSpace interface, but all other interfaces should have an equally detailed interface, which should be discussed in the issues section of the git-hub repository.

No contribution will be accepted without a small unit test!. I'm using nose to do unit testing: https://nose.readthedocs.org/en/latest/. In particular it is enough to write a test file in the directory ./tests. If the filename contains the word Test or test surrounded by _ it will be executed as a unit. If it contains functions whose name contains test or Test (surrounded by _ or at end/begin of the name)

  • An abstract python interface of type Shape, used to describe the shape of a computable object. [TBD: interface]

  • An abstract python interface of type Position, used to describe the position of a computable object. [TBD: interface]

  • An abstract python interface of type VectorSpace, used to describe one dimensional functions on [a,b], as coefficients times basis functions, with access to single basis functions, their derivatives, their support and the splitting of [a,b] into sub-intervals where each basis is assumed to be smooth. In particular, the following structure should be implemented for each type of basis:

    • VectorSpace.n_dofs: the number of basis functions that span the space (degrees of freedom)
    • VectorSpace.n_dofs_per_end_point: the number of dofs associated with the end points
    • VectorSpace.n_cells: the number of sub-intervals of [a,b] where each basis is smooth
    • VectorSpace.cells: the n_cells+1 splitting points that make the cells of the VectorSpace
    • VectorSpace.basis(i): the ith basis function (a callable function)
    • VectorSpace.basis_der(i, d): the d-th derivative of the i-th basis function (a callable function)
    • VectorSpace.basis_span(i): a tuple indicating the start and end indices into the cells object where the i-th basis function is different from zero
    • VectorSpace.cell_span(i): an array of indices containing the basis functions which are non zero on the i-th cell
    • VectorSpace.element(c): a callable function, representing sum(c[i] * basis[i]), which exploits the locality of the basis functions
  • The implementation of the above for

    • Power basis functions
    • Continuous Lagrange (Newton-Cotes with and without end points) basis functions, of degree n with 1 repetition
    • Bernstein basis functions of degree n with 1 repetition
    • B-spline basis functions with given degree and knot_vector
    • NURBS basis functions with given degree and knot_vector
  • A CompositeVectorSpace, taking a subdivision of the interval [a,b], a VectorSpace on [0,1] and constructing a composite vector space which is a rescaled repetition of VectorSpace on each subinterval

  • An abstract python interface of type TimeAnalysis, capable of taking derivatives and integrals of collections of paths, given an actual VectorSpace object, and a matrix with VectorSpace.n_dofs rows and an arbitrary number of columns, representing functions of the given VectorSpace

  • An Interpolation utility, taking a VectorSpace, n_dofs points, and constructing a solution c to the problem sum_over_j(c[j]*b[j](x[j])) = f(x[i])

  • A LeastSquare utility, doing the same but with n>n_dofs points and using least squares

  • A MassMatrix assembler, computing the sparse matrix $M_{ij} = \int_0^1 v_i(x) v_j(x) dx$ exploiting locality of the VectorSpace and a Quadrature formula given at construction time

  • A StiffnessMatrix assembler, computing the sparse stiffness matrix $K_{ij} = \int_0^1 v'_i(x) v'_j(x) dx$ exploiting locality of the VectorSpace and a Quadrature formula given at construction time

  • A ArcLengthReparametrization, taking a matrix of coefficients representing a curve in a VectorSpace, and creating a new one via a LeastSquare fit which satisfies c'(x) = L for each x

  • A CurveFromCurvature function, which takes a vector function g(x) representing the curvature of a curve parametrized with arc length, and returns the curve satisfying c(0) = 0, c'(x) = L for x in [0,1] and c''(x) = g(x)

  • An abstract interface EquationOfMotion, taking a Shape and returning a Position, such that some underlying equations are satisfied [TBD: Interface]. For this interface, we will construct

    • collection of sphere swimmers
    • filament swimmers using resistive force theory
    • crawlers
  • An abstract optimization tool, taking an EquationOfMotion, computing a CostFunction associated to it, imposing a ConstraintEquation on it, and optimizing the Shape evolution, in order to obtain a Shape that satisfies the ConstraintEquation and minimizes the CostFunction

  • A Blender interface

    • given two files, containing numpy nd-arrays (as created by numpy.save), representing the time evolution of the position and shape, this interface should create an animation capable of visualising the time evolution of the object. We will need interfaces for the following objects

      • Golestanian Axis Swimmer (m=1, n=2)
      • Golestanian Plane Swimmer (m=2, n=3)
      • Golestanian Space Swimmer (m=6, n=4)
      • Axis crawler (m=1, n=as many as you wish)
      • Plane worm (m=2, n=as many as you wish)
      • Space worm (m=6, n=as many as you wish)
      • etc.

Naming Conventions

  • Classes and types generally are named using uppercase letters to denote word beginnings (e.g. VectorSpace) - sometimes called camel case - while functions and variables use lowercase letters and underscores to separate words

  • All file names should use lowercase letters and underscores to separate words

  • Functions or members which return or contain the number of something (number of cells, degrees of freedom, etc) should start with n_*. Example: VectorSpace.n_dofs

  • Function which set a bit or flag should start with set_*; functions which clear bits of flags should be named clear_*

  • Function and variable names may not consist of only one or two letters, unless the variable is a pure counting index.

  • Exceptions are used for internal parameter checking and for consistency checks through the assert mechanism.

  • Each class has to have at least 200 pages of documentation ;-)

Defensive Programming

Defensive programming is a term that we use frequently when we talk about writing code while in the mindset that errors will happen. Here, errors can come in two ways: first, I can make a mistake myself while writing a functions; and secondly, someone else can make a mistake while calling my function. In either case, I would like to write my code in such a way that errors are (i) as unlikely as possible, (ii) that the python interpreter can already find some of the mistakes, and (iii) that the remaining mistakes are relatively easy to find, for example because the program aborts. Defensive programming is then a set of strategies that make these goals more likely.

Over time, we have learned a number of techniques to this end, some of which we list here:

  • Assert preconditions on parameters: People call functions with wrong or nonsensical parameters, all the time. Say your function expects to work with two lists of the same length:
  
  def compare_lists(left, right):
	  # do something with left and right for each element

then make sure that you abort your program if the lists are not compatible:

  
  def compare_lists(left, right):
	  assert len(left) == len(right)
	  # do something with left and right for each element

Take a look at https://wiki.python.org/moin/UsingAssertionsEffectively for a more detailed discussion.

Notice that you can turn off assertion automatically: if Python is started with the -O option, then assertions will be stripped out and not evaluated, so you are not adding any overhead to your code. You are only making your life easier...

License:

Please see the file ./LICENSE for details

Continuous Integration Status:

Build Status

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