Metadata-Version: 2.1
Name: blis
Version: 0.2.1
Summary: The Blis BLAS-like linear algebra library, as a self-contained C-extension.
Home-page: https://github.com/explosion/cython-blis
Author: Matthew Honnibal
Author-email: matt@explosion.ai
License: MIT
Platform: UNKNOWN
Classifier: Development Status :: 4 - Beta
Classifier: Environment :: Console
Classifier: Intended Audience :: Developers
Classifier: Intended Audience :: Information Technology
Classifier: License :: OSI Approved :: MIT License
Classifier: Operating System :: POSIX :: Linux
Classifier: Operating System :: MacOS :: MacOS X
Classifier: Programming Language :: Cython
Classifier: Programming Language :: Python :: 2.7
Classifier: Programming Language :: Python :: 3.5
Classifier: Programming Language :: Python :: 3.6
Classifier: Topic :: Scientific/Engineering
Requires-Dist: numpy (>=1.15.0)

Cython BLIS: Fast BLAS-like operations from Python and Cython, without the tears
================================================================================

This repository provides the `Blis linear algebra <https://github.com/flame/blis>`_
routines as a self-contained Python C-extension.

Currently, we only supports single-threaded execution, as this is actually best for our workloads (ML inference).

.. image:: https://img.shields.io/travis/explosion/cython-blis/master.svg?style=flat-square
    :target: https://travis-ci.org/explosion/cython-blis
    :alt: Build Status

.. image:: https://img.shields.io/pypi/v/blis.svg?style=flat-square
    :target: https://pypi.python.org/pypi/blis
    :alt: pypi Version

Overview
--------

You can install the package via pip:

.. code:: bash

    pip install blis

Wheels should be available, so installation should be fast. If you want to install from source and you're on Windows, you'll need to install LLVM.

After installation, run a small matrix multiplication benchmark:

.. code:: bash

    $ export OMP_NUM_THREADS=1 # Tell Numpy to only use one thread.
    $ python -m blis.benchmark
    Setting up data nO=384 nI=384 batch_size=2000. Running 1000 iterations
    Blis...
    Total: 11032014.6484
    7.35 seconds
    Numpy (Openblas)...
    Total: 11032016.6016
    16.81 seconds
    Blis einsum ab,cb->ca
    8.10 seconds
    Numpy einsum ab,cb->ca
    Total: 5510596.19141
    83.18 seconds

The low ``numpy.einsum`` performance is
expected, but the low `numpy.dot` performance is surprising. Linking numpy
against MKL gives better performance:

.. code:: bash

    Numpy (mkl_rt) gemm...
    Total: 11032011.71875
    5.21 seconds


These figures refer to performance on a Dell XPS 13 i7-7500U.  Running the
same benchmark on a 2015 Macbook Air gives:

.. code:: bash

    Blis...
    Total: 11032014.6484
    8.89 seconds
    Numpy (Accelerate)...
    Total: 11032012.6953
    6.68 seconds

Clearly the Dell's numpy+OpenBLAS performance is the outlier, so it's likely
something has gone wrong in the compilation and architecture detection.


Usage
-----

Two APIs are provided: a high-level Python API, and direct
`Cython <http://cython.org>`_ access. The best part of the Python API is the
`einsum function <https://obilaniu6266h16.wordpress.com/2016/02/04/einstein-summation-in-numpy/>`_,
which works like numpy's, but with some restrictions that allow
a direct mapping to Blis routines. Example usage:

.. code:: python

    from blis.py import einsum
    from numpy import ndarray, zeros

    dim_a = 500
    dim_b = 128
    dim_c = 300
    arr1 = ndarray((dim_a, dim_b))
    arr2 = ndarray((dim_b, dim_c))
    out = zeros((dim_a, dim_c))

    einsum('ab,bc->ac', arr1, arr2, out=out)
    # Change dimension order of output
    out = einsum('ab,bc->ca', arr1, arr2)
    assert out.shape == (dim_a, dim_c)
    # Matrix vector product, with transposed output
    arr2 = ndarray((dim_b,))
    out = einsum('ab,b->ba', arr1, arr2)
    assert out.shape == (dim_b, dim_a)

The Einstein summation format is really awesome, so it's always been
disappointing that it's so much slower than equivalent calls to ``tensordot``
in numpy. The ``blis.einsum`` function gives up the numpy version's generality,
so that calls can be easily mapped to Blis:

* Only two input tensors
* Maximum two dimensions
* Dimensions must be labelled ``a``, ``b`` and ``c``
* The first argument's dimensions must be ``'a'`` (for 1d inputs) or ``'ab'`` (for 2d inputs).

With these restrictions, there are ony 15 valid combinations – which
correspond to all the things you would otherwise do with the ``gemm``, ``gemv``,
``ger`` and ``axpy`` functions. You can therefore forget about all the other
functions and just use the ``einsum``. Here are the valid einsum strings, the
calls they correspond to, and the numpy equivalents:

=============== ========================================== =================
Equation        Maps to                                    Numpy
=============== ========================================== =================
``'a,a->a'``    ``axpy(A, B)``                             ``A+B``
``'a,b->ab'``   ``ger(A, B)``                              ``outer(A, B)``
``'a,b->ba'``   ``ger(B, A)``                              ``outer(B, A)``
``'ab,a->ab'``  ``batch_axpy(A, B)``                       ``A*B``
``'ab,a->ba'``  ``batch_axpy(A, B, trans1=True)``          ``(A*B).T``
``'ab,b->a'``   ``gemv(A, B)``                             ``A*B``
``'ab,a->b'``   ``gemv(A, B, trans1=True)``                ``A.T*B``
``'ab,ac->bc'`` ``gemm(A, B, trans1=True, trans2=False)``  ``dot(A.T, B)``
``'ab,ac->cb'`` ``gemm(B, A, trans1=True, trans2=True)``   ``dot(B.T, A)``
``'ab,bc->ac'`` ``gemm(A, B, trans1=False, trans2=False)`` ``dot(A, B)``
``'ab,bc->ca'`` ``gemm(B, A, trans1=False, trans2=True)``  ``dot(B.T, A.T)``
``'ab,ca->bc'`` ``gemm(A, B, trans1=True, trans2=True)``   ``dot(B, A.T)``
``'ab,ca->cb'`` ``gemm(B, A, trans1=False, trans2=False)`` ``dot(B, A)``
``'ab,cb->ac'`` ``gemm(A, B, trans1=False, trans2=True)``  ``dot(A.T, B.T)``
``'ab,cb->ca'`` ``gemm(B, A, trans1=False, trans2=True)``  ``dot(B, A.T)``
=============== ========================================== =================

We also provide fused-type, nogil Cython bindings to the underlying
Blis linear algebra library. Fused types are a simple template mechanism,
allowing just a touch of compile-time generic programming:

.. code:: python

    cimport blis.cy
    A = <float*>calloc(nN * nI, sizeof(float))
    B = <float*>calloc(nO * nI, sizeof(float))
    C = <float*>calloc(nr_b0 * nr_b1, sizeof(float))
    blis.cy.gemm(blis.cy.NO_TRANSPOSE, blis.cy.NO_TRANSPOSE,
                 nO, nI, nN,
                 1.0, A, nI, 1, B, nO, 1,
                 1.0, C, nO, 1)


Bindings have been added as we've needed them. Please submit pull requests if
the library is missing some functions you require.

Development
-----------

To build the source package, you should run the following command:

.. code:: bash

    ./bin/copy-source-files.sh

This populates the ``blis/_src`` folder for the various architectures, using the 
``flame-blis`` submodule.


