from __future__ import division, print_function, absolute_import

from . import _nnls
from numpy import asarray_chkfinite, zeros, double

__all__ = ['nnls']


def nnls(A, b):
    """
    Solve ``argmin_x || Ax - b ||_2`` for ``x>=0``. This is a wrapper
    for a FORTAN non-negative least squares solver.

    Parameters
    ----------
    A : ndarray
        Matrix ``A`` as shown above.
    b : ndarray
        Right-hand side vector.

    Returns
    -------
    x : ndarray
        Solution vector.
    rnorm : float
        The residual, ``|| Ax-b ||_2``.

    Notes
    -----
    The FORTRAN code was published in the book below. The algorithm
    is an active set method. It solves the KKT (Karush-Kuhn-Tucker)
    conditions for the non-negative least squares problem.

    References
    ----------
    Lawson C., Hanson R.J., (1987) Solving Least Squares Problems, SIAM

    """

    A, b = map(asarray_chkfinite, (A, b))

    if len(A.shape) != 2:
        raise ValueError("expected matrix")
    if len(b.shape) != 1:
        raise ValueError("expected vector")

    m, n = A.shape

    if m != b.shape[0]:
        raise ValueError("incompatible dimensions")

    w = zeros((n,), dtype=double)
    zz = zeros((m,), dtype=double)
    index = zeros((n,), dtype=int)

    x, rnorm, mode = _nnls.nnls(A, m, n, b, w, zz, index)
    if mode != 1:
        raise RuntimeError("too many iterations")

    return x, rnorm