Metadata-Version: 2.1
Name: pyneqsys
Version: 0.5.4
Summary: Package for numerically solving symbolically defined systems of non-linear equations.
Home-page: https://github.com/bjodah/pyneqsys
Author: Bjoern I. Dahlgren 
Author-email: bjodah@gmail.com
License: BSD
Description: pyneqsys
        ========
        
        .. image:: http://hera.physchem.kth.se:9090/api/badges/bjodah/pyneqsys/status.svg
           :target: http://hera.physchem.kth.se:9090/bjodah/pyneqsys
           :alt: Build status
        .. image:: https://circleci.com/gh/bjodah/pyneqsys.svg?style=svg
           :target: https://circleci.com/gh/bjodah/pyneqsys
           :alt: Build status on CircleCI
        .. image:: https://secure.travis-ci.org/bjodah/pyneqsys.svg?branch=master
           :target: http://travis-ci.org/bjodah/pyneqsys
           :alt: Build status on Travis-CI
        .. image:: https://img.shields.io/pypi/v/pyneqsys.svg
           :target: https://pypi.python.org/pypi/pyneqsys
           :alt: PyPI version
        .. image:: https://img.shields.io/badge/python-2.7,3.5,3.6-blue.svg
           :target: https://www.python.org/
           :alt: Python version
        .. image:: http://joss.theoj.org/papers/10.21105/joss.00531/status.svg
           :target: https://doi.org/10.21105/joss.00531
           :alt: DOI
        .. image:: https://img.shields.io/pypi/l/pyneqsys.svg
           :target: https://github.com/bjodah/pyneqsys/blob/master/LICENSE
           :alt: License file
        .. image:: http://hera.physchem.kth.se/~pyneqsys/branches/master/htmlcov/coverage.svg
           :target: http://hera.physchem.kth.se/~pyneqsys/branches/master/htmlcov
           :alt: coverage
        
        pyneqsys provides a convenience class for 
        representing and solving non-linear equation systems from symbolic expressions
        (provided e.g. with the help of SymPy_).
        
        The numerical root finding is perfomed using either:
        
        - scipy: `scipy.optimize.root <http://docs.scipy.org/doc/scipy/reference/generated/scipy.optimize.root.html>`_
        - mpmath (arbitrary precision): `mpmath.calculus.optimization.MDNewton <http://mpmath.org/doc/1.0.0/calculus/optimization.html#mpmath.calculus.optimization.MDNewton>`_
        - kinsol (from SUNDIALS): `pykinsol.solve <http://bjodah.github.io/pykinsol/latest/pykinsol.html#pykinsol.solve>`_
        - nleq2 (ZIB library free for academic use): `pynleq2.solve <http://bjodah.github.io/pynleq2/pynleq2.html#pynleq2.solve>`_
        - levmar (Levenberg-Marquardt): `levmar.levmar <https://bjodah.github.io/levmar/latest/levmar.html#levmar.levmar>`_
        
        In addition to offering a unified interface to different solvers, pyneqsys
        can also derive the Jacobian analytically (when using ``pyneqsys.SymbolicSys``).
        This is useful since doing so manually is widely recognized as both tedious and error
        prone.
        
        The symbolic representation is usually in the form of SymPy_ expressions,
        but the user may choose another symbolic back-end (see `sym <https://github.com/bjodah/sym>`_).
        
        In addition to deriving the Jacobian analytically the symbolic representation can for
        example apply row-reduce. This is usful for when you have a overdetermined system (
        formed from e.g. applying conservation laws) and want to solve the system by
        root-finding rather than using a least-square optimization of e.g. Levenberg-Marquardt
        style.
        
        Last, but not the least having a symbolic representation of your system of equations
        allows you to generate publication quality latex representations of your equations (through
        SymPy's latex printer) from a **single** source‒no more error prone hand-rewriting of the same
        equations in another format for presentation!
        
        .. _SymPy: http://www.sympy.org
        
        Documentation
        -------------
        Autogenerated API documentation for latest stable release is found here:
        `<https://bjodah.github.io/pyneqsys/latest>`_
        (and the development version for the current master branch is found here:
        `<http://hera.physchem.kth.se/~pyneqsys/branches/master/html>`_).
        
        Installation
        ------------
        Simplest way to install pyneqsys and its dependencies is through the `conda package manager <http://conda.pydata.org/docs/>`_:
        
        ::
        
           $ conda install -c bjodah pyneqsys pytest
           $ pytest --pyargs pyneqsys
        
        Optional dependencies
        ~~~~~~~~~~~~~~~~~~~~~
        If you used ``conda`` to install pyneqsys_ you can skip this section.
        But if you use ``pip`` you may want to know that the default installation
        of ``pyneqsys`` only requires SciPy::
        
           $ pip install pyneqsys
           $ pytest --pyargs pyneqsys -rs
        
        The above command should finish without errors but with some skipped tests.
        The reason for why some tests are skipped should be because missing optional solvers.
        To install the optional solvers you will first need to install third party libraries for
        the solvers and then their python bindings. The 3rd party requirements are as follows:
        
        - `pykinsol <https://github.com/bjodah/pykinsol>`_ (requires SUNDIALS_ ==2.7.0)
        - `levar <https://github.com/bjodah/levmar>`_
        - `mpmath <http://www.mpmath.org>`_
        
        
        if you want to see what packages need to be installed on a Debian based system you may look at this
        `Dockerfile <scripts/environment/Dockerfile>`_.
        
        If you manage to install all three external libraries you may install pyneqsys with the option "all"::
        
          $ pip install pyneqsys[all]
          $ pytest --pyargs pyneqsys -rs
        
        now there should be no skipped tests. If you try to install pyneqsys on a machine where you do not have
        root permissions you may find the flag ``--user`` helpful when using pip. Also if there are multiple
        versions of python installed you may want to invoke python for an explicit version of python, e.g.::
        
          $ python3.6 -m pip install --user pyneqsys[all]
        
        see `setup.py <setup.py>`_ for the exact list of requirements.
        
        .. _SUNDIALS: https://computation.llnl.gov/projects/sundials
        
        Using Docker
        ~~~~~~~~~~~~
        If you have `Docker <https://www.docker.com>`_ installed, you may use it to host a jupyter
        notebook server::
        
          $ ./scripts/host-jupyter-using-docker.sh . 8888
        
        the first time you run the command some dependencies will be downloaded. When the installation
        is complete there will be a link visible which you can open in your browser. You can also run
        the test suite using the same docker-image::
        
          $ ./scripts/host-jupyter-using-docker.sh . 0
        
        there will be one skipped test (due to symengine missing in this pip installed environment) and
        quite a few instances of RintimeWarning.
        
        Examples
        --------
        Example reformulated from `SciPy documentation <http://docs.scipy.org/doc/scipy/reference/generated/scipy.optimize.root.html>`_:
        
        .. code:: python
        
           >>> from pyneqsys.symbolic import SymbolicSys
           >>> neqsys = SymbolicSys.from_callback(
           ...     lambda x: [(x[0] - x[1])**3/2 + x[0] - 1,
           ...                (x[1] - x[0])**3/2 + x[1]], 2)
           >>> x, info = neqsys.solve([1, 0])
           >>> assert info['success']
           >>> print(x)
           [ 0.8411639  0.1588361]
        
        here we did not need to enter the jacobian manually, SymPy did that for us.
        For expressions containing transcendental functions we need to provide a
        "backend" keyword arguemnt to enable symbolic derivation of the jacobian:
        
        .. code:: python
        
           >>> import math
           >>> def powell(x, params, backend=math):
           ...     A, exp = params[0], backend.exp
           ...     return A*x[0]*x[1] - 1, exp(-x[0]) + exp(-x[1]) - (1 + A**-1)
           >>> powell_sys = SymbolicSys.from_callback(powell, 2, 1, names='x0 x1'.split())
           >>> x, info = powell_sys.solve([1, 1], [1000.0])
           >>> assert info['success']
           >>> print(', '.join(['%.6e' % _ for _ in sorted(x)]))
           1.477106e-04, 6.769996e+00
        
        pyneqsys also allows the user to solve a system of equations for a span of
        values for a parameter, and optionally plot the result vs. the varied value:
        
        .. code:: python
        
           >>> import matplotlib.pyplot as plt
           >>> import numpy as np
           >>> x0_varied, x0_idx = np.linspace(1e3, 3e3), 0
           >>> all_x, all_info = powell_sys.solve_and_plot_series(x, [1000.0], x0_varied, x0_idx)
           >>> plt.savefig('example.png')
        
        .. image:: https://raw.githubusercontent.com/bjodah/pyneqsys/master/examples/example.png
        
        For more examples look see
        `examples/ <https://github.com/bjodah/pyneqsys/tree/master/examples>`_, and rendered jupyter notebooks here:
        `<http://hera.physchem.kth.se/~pyneqsys/branches/master/examples>`_
        
        Run notebooks using binder
        ~~~~~~~~~~~~~~~~~~~~~~~~~~
        Using only a web-browser (and an internet connection) it is possible to explore the
        notebooks here: (by the courtesy of the people behind mybinder)
        
        .. image:: http://mybinder.org/badge.svg
           :target: https://mybinder.org/v2/gh/bjodah/pyneqsys/d8775becc6f30b4d3e7920f53d5f318c0672195b?filepath=index.ipynb
           :alt: Binder
        
        Citing
        ------
        If you make use of pyneqsys in e.g. academic work you may cite the following peer-reviewed publication:
        
        .. image:: http://joss.theoj.org/papers/10.21105/joss.00531/status.svg
           :target: https://doi.org/10.21105/joss.00531
           :alt: Journal of Open Source Software DOI
        
        Depending on what underlying solver you are using you should also cite the appropriate paper
        (you can look at the list of references in the JOSS article). If you need to reference,
        in addition to the paper, a specific point version of pyneqsys (for e.g. reproducibility)
        you can get per-version DOIs from the zendodo archive:
        
        .. image:: https://zenodo.org/badge/43504371.svg
           :target: https://zenodo.org/badge/latestdoi/43504371
           :alt: Zenodo DOI
        
        
        Licensing
        ---------
        The source code is Open Source and is released under the simplified 2-clause BSD license. See LICENSE_ for further details.
        
        .. _LICENSE: LICENSE
        
        
        Contributing
        ------------
        Contributors are welcome to suggest improvements at https://github.com/bjodah/pyneqsys
        (see further details `here <CONTRIBUTING.rst>`_).
        
        Author
        ------
        Björn I. Dahlgren, contact:
        
        - gmail address: bjodah
        - kth.se address: bda
        
Platform: UNKNOWN
Classifier: Development Status :: 4 - Beta
Classifier: License :: OSI Approved :: BSD License
Classifier: Operating System :: OS Independent
Classifier: Topic :: Scientific/Engineering
Classifier: Topic :: Scientific/Engineering :: Mathematics
Provides-Extra: docs
Provides-Extra: all
Provides-Extra: testing
Provides-Extra: symbolic
Provides-Extra: solvers
