"""
Utility functions for working with CVXOPT matrices (instances of the
``cvxopt.base.matrix`` class).
"""

from math import sqrt
from cvxopt import matrix

def append_col(left, right):
    """
    Append the matrix ``right`` to the right side of the matrix ``left``.

    EXAMPLES:

        >>> A = matrix([1,2,3,4], (2,2))
        >>> B = matrix([5,6,7,8,9,10], (2,3))
        >>> print(append_col(A,B))
        [  1   3   5   7   9]
        [  2   4   6   8  10]
        <BLANKLINE>

    """
    return matrix([left.trans(), right.trans()]).trans()

def append_row(top, bottom):
    """
    Append the matrix ``bottom`` to the bottom of the matrix ``top``.

    EXAMPLES:

        >>> A = matrix([1,2,3,4], (2,2))
        >>> B = matrix([5,6,7,8,9,10], (3,2))
        >>> print(append_row(A,B))
        [  1   3]
        [  2   4]
        [  5   8]
        [  6   9]
        [  7  10]
        <BLANKLINE>

    """
    return matrix([top, bottom])

def identity(domain_dim):
    """
    Return a ``domain_dim``-by-``domain_dim`` dense integer identity
    matrix.

    EXAMPLES:

       >>> print(identity(3))
       [ 1  0  0]
       [ 0  1  0]
       [ 0  0  1]
       <BLANKLINE>

    """
    if domain_dim <= 0:
        raise ValueError('domain dimension must be positive')

    entries = [int(i == j)
               for i in range(domain_dim)
               for j in range(domain_dim)]
    return matrix(entries, (domain_dim, domain_dim))


def norm(matrix_or_vector):
    """
    Return the Frobenius norm of ``matrix_or_vector``, which is the same
    thing as its Euclidean norm when it's a vector (when one of its
    dimensions is unity).

    EXAMPLES:

        >>> v = matrix([1,1])
        >>> print('{:.5f}'.format(norm(v)))
        1.41421

        >>> A = matrix([1,1,1,1], (2,2))
        >>> norm(A)
        2.0

    """
    return sqrt(sum([x**2 for x in matrix_or_vector]))