from __future__ import division
import numpy as np
import scipy.sparse as sp
[docs]def mkvc(x, numDims=1):
"""Creates a vector with the number of dimension specified
e.g.::
a = np.array([1, 2, 3])
mkvc(a, 1).shape
> (3, )
mkvc(a, 2).shape
> (3, 1)
mkvc(a, 3).shape
> (3, 1, 1)
"""
if type(x) == np.matrix:
x = np.array(x)
if hasattr(x, 'tovec'):
x = x.tovec()
if isinstance(x, Zero):
return x
assert isinstance(x, np.ndarray), "Vector must be a numpy array"
if numDims == 1:
return x.flatten(order='F')
elif numDims == 2:
return x.flatten(order='F')[:, np.newaxis]
elif numDims == 3:
return x.flatten(order='F')[:, np.newaxis, np.newaxis]
[docs]def sdiag(h):
"""Sparse diagonal matrix"""
if isinstance(h, Zero):
return Zero()
return sp.spdiags(mkvc(h), 0, h.size, h.size, format="csr")
[docs]def sdInv(M):
"""Inverse of a sparse diagonal matrix"""
return sdiag(1.0 / M.diagonal())
[docs]def speye(n):
"""Sparse identity"""
return sp.identity(n, format="csr")
[docs]def kron3(A, B, C):
"""Three kron prods"""
return sp.kron(sp.kron(A, B), C, format="csr")
[docs]def spzeros(n1, n2):
"""a sparse matrix of zeros"""
return sp.dia_matrix((n1, n2))
[docs]def ddx(n):
"""Define 1D derivatives, inner, this means we go from n+1 to n"""
return sp.spdiags(
(np.ones((n+1, 1))*[-1, 1]).T, [0, 1], n, n+1,
format="csr"
)
[docs]def av(n):
"""Define 1D averaging operator from nodes to cell-centers."""
return sp.spdiags(
(0.5*np.ones((n+1, 1))*[1, 1]).T, [0, 1], n, n+1,
format="csr"
)
[docs]def ndgrid(*args, **kwargs):
"""
Form tensorial grid for 1, 2, or 3 dimensions.
Returns as column vectors by default.
To return as matrix input:
ndgrid(..., vector=False)
The inputs can be a list or separate arguments.
e.g.::
a = np.array([1, 2, 3])
b = np.array([1, 2])
XY = ndgrid(a, b)
> [[1 1]
[2 1]
[3 1]
[1 2]
[2 2]
[3 2]]
X, Y = ndgrid(a, b, vector=False)
> X = [[1 1]
[2 2]
[3 3]]
> Y = [[1 2]
[1 2]
[1 2]]
"""
# Read the keyword arguments, and only accept a vector=True/False
vector = kwargs.pop('vector', True)
assert type(vector) == bool, "'vector' keyword must be a bool"
assert len(kwargs) == 0, "Only 'vector' keyword accepted"
# you can either pass a list [x1, x2, x3] or each seperately
if type(args[0]) == list:
xin = args[0]
else:
xin = args
# Each vector needs to be a numpy array
assert np.all(
[isinstance(x, np.ndarray) for x in xin]
), "All vectors must be numpy arrays."
if len(xin) == 1:
return xin[0]
elif len(xin) == 2:
XY = np.broadcast_arrays(mkvc(xin[1], 1), mkvc(xin[0], 2))
if vector:
X2, X1 = [mkvc(x) for x in XY]
return np.c_[X1, X2]
else:
return XY[1], XY[0]
elif len(xin) == 3:
XYZ = np.broadcast_arrays(
mkvc(xin[2], 1), mkvc(xin[1], 2), mkvc(xin[0], 3)
)
if vector:
X3, X2, X1 = [mkvc(x) for x in XYZ]
return np.c_[X1, X2, X3]
else:
return XYZ[2], XYZ[1], XYZ[0]
[docs]def ind2sub(shape, inds):
"""From the given shape, returns the subscripts of the given index"""
if type(inds) is not np.ndarray:
inds = np.array(inds)
assert len(inds.shape) == 1, (
'Indexing must be done as a 1D row vector, e.g. [3,6,6,...]'
)
return np.unravel_index(inds, shape, order='F')
[docs]def sub2ind(shape, subs):
"""From the given shape, returns the index of the given subscript"""
if len(shape) == 1:
return subs
if type(subs) is not np.ndarray:
subs = np.array(subs)
if len(subs.shape) == 1:
subs = subs[np.newaxis, :]
assert subs.shape[1] == len(shape), (
'Indexing must be done as a column vectors. e.g. [[3,6],[6,2],...]'
)
inds = np.ravel_multi_index(subs.T, shape, order='F')
return mkvc(inds)
[docs]def getSubArray(A, ind):
"""subArray"""
assert type(ind) == list, "ind must be a list of vectors"
assert len(A.shape) == len(ind), (
"ind must have the same length as the dimension of A"
)
if len(A.shape) == 2:
return A[ind[0], :][:, ind[1]]
elif len(A.shape) == 3:
return A[ind[0], :, :][:, ind[1], :][:, :, ind[2]]
else:
raise Exception("getSubArray does not support dimension asked.")
[docs]def inv3X3BlockDiagonal(
a11, a12, a13, a21, a22, a23, a31, a32, a33, returnMatrix=True
):
""" B = inv3X3BlockDiagonal(a11, a12, a13, a21, a22, a23, a31, a32, a33)
inverts a stack of 3x3 matrices
Input:
A - a11, a12, a13, a21, a22, a23, a31, a32, a33
Output:
B - inverse
"""
a11 = mkvc(a11)
a12 = mkvc(a12)
a13 = mkvc(a13)
a21 = mkvc(a21)
a22 = mkvc(a22)
a23 = mkvc(a23)
a31 = mkvc(a31)
a32 = mkvc(a32)
a33 = mkvc(a33)
detA = (
a31*a12*a23 -
a31*a13*a22 -
a21*a12*a33 +
a21*a13*a32 +
a11*a22*a33 -
a11*a23*a32
)
b11 = +(a22*a33 - a23*a32)/detA
b12 = -(a12*a33 - a13*a32)/detA
b13 = +(a12*a23 - a13*a22)/detA
b21 = +(a31*a23 - a21*a33)/detA
b22 = -(a31*a13 - a11*a33)/detA
b23 = +(a21*a13 - a11*a23)/detA
b31 = -(a31*a22 - a21*a32)/detA
b32 = +(a31*a12 - a11*a32)/detA
b33 = -(a21*a12 - a11*a22)/detA
if not returnMatrix:
return b11, b12, b13, b21, b22, b23, b31, b32, b33
return sp.vstack((sp.hstack((sdiag(b11), sdiag(b12), sdiag(b13))),
sp.hstack((sdiag(b21), sdiag(b22), sdiag(b23))),
sp.hstack((sdiag(b31), sdiag(b32), sdiag(b33)))))
[docs]def inv2X2BlockDiagonal(a11, a12, a21, a22, returnMatrix=True):
""" B = inv2X2BlockDiagonal(a11, a12, a21, a22)
Inverts a stack of 2x2 matrices by using the inversion formula
inv(A) = (1/det(A)) * cof(A)^T
Input:
A - a11, a12, a21, a22
Output:
B - inverse
"""
a11 = mkvc(a11)
a12 = mkvc(a12)
a21 = mkvc(a21)
a22 = mkvc(a22)
# compute inverse of the determinant.
detAinv = 1./(a11*a22 - a21*a12)
b11 = +detAinv*a22
b12 = -detAinv*a12
b21 = -detAinv*a21
b22 = +detAinv*a11
if not returnMatrix:
return b11, b12, b21, b22
return sp.vstack((sp.hstack((sdiag(b11), sdiag(b12))),
sp.hstack((sdiag(b21), sdiag(b22)))))
[docs]class Zero(object):
"""
An efficient zero object.
"""
__numpy_ufunc__ = True
__array_ufunc__ = None
def __add__(self, v):
return v
def __radd__(self, v):
return v
def __iadd__(self, v):
return v
def __sub__(self, v):
return -v
def __rsub__(self, v):
return v
def __isub__(self, v):
return v
def __mul__(self, v):
return self
def __rmul__(self, v):
return self
def __div__(self, v):
return self
def __truediv__(self, v):
return self
def __rdiv__(self, v):
raise ZeroDivisionError('Cannot divide by zero.')
def __rtruediv__(self, v):
raise ZeroDivisionError('Cannot divide by zero.')
def __rfloordiv__(self, v):
raise ZeroDivisionError('Cannot divide by zero.')
def __pos__(self):
return self
def __neg__(self):
return self
def __lt__(self, v):
return 0 < v
def __le__(self, v):
return 0 <= v
def __eq__(self, v):
return v == 0
def __ne__(self, v):
return not (0 == v)
def __ge__(self, v):
return 0 >= v
def __gt__(self, v):
return 0 > v
[docs] def transpose(self):
return self
@property
def T(self):
return self
[docs]class Identity(object):
"""
An efficient identity object.
"""
__numpy_ufunc__ = True
__array_ufunc__ = None
_positive = True
def __init__(self, positive=True):
self._positive = positive is True
def __pos__(self):
return self
def __neg__(self):
return Identity(not self._positive)
def __add__(self, v):
if sp.issparse(v):
return (
v + speye(v.shape[0]) if self._positive else
v - speye(v.shape[0])
)
return v + 1 if self._positive else v - 1
def __radd__(self, v):
return self.__add__(v)
def __sub__(self, v):
return self+-v
def __rsub__(self, v):
return -self+v
def __mul__(self, v):
return v if self._positive else -v
def __rmul__(self, v):
return v if self._positive else -v
def __div__(self, v):
if sp.issparse(v):
raise NotImplementedError('Sparse arrays not divisibile.')
return 1/v if self._positive else -1/v
def __truediv__(self, v):
if sp.issparse(v):
raise NotImplementedError('Sparse arrays not divisibile.')
return 1.0/v if self._positive else -1.0/v
def __rdiv__(self, v):
return v if self._positive else -v
def __rtruediv__(self, v):
return v if self._positive else -v
def __floordiv__(self, v):
return 1//v if self._positive else -1//v
def __rfloordiv__(self, v):
return 1//v if self._positivie else -1//v
def __lt__(self, v):
return 1 < v if self._positive else -1 < v
def __le__(self, v):
return 1 <= v if self._positive else -1 <= v
def __eq__(self, v):
return v == 1 if self._positive else v == -1
def __ne__(self, v):
return (not (1 == v))if self._positive else (not (-1 == v))
def __ge__(self, v):
return 1 >= v if self._positive else -1 >= v
def __gt__(self, v):
return 1 > v if self._positive else -1 > v
@property
def T(self):
return self
[docs] def transpose(self):
return self