Sparse matrices (scipy.sparse
)#
SciPy 2-D sparse array package for numeric data.
Note
This package is switching to an array interface, compatible with
NumPy arrays, from the older matrix interface. We recommend that
you use the array objects (bsr_array
, coo_array
, etc.) for
all new work.
When using the array interface, please note that:
x * y
no longer performs matrix multiplication, but element-wise multiplication (just like with NumPy arrays). To make code work with both arrays and matrices, usex @ y
for matrix multiplication.Operations such as sum, that used to produce dense matrices, now produce arrays, whose multiplication behavior differs similarly.
Sparse arrays currently must be two-dimensional. This also means that all slicing operations on these objects must produce two-dimensional results, or they will result in an error. This will be addressed in a future version.
The construction utilities (eye
, kron
, random
, diags
, etc.)
have not yet been ported, but their results can be wrapped into arrays:
A = csr_array(eye(3))
Contents#
Sparse array classes#
|
Block Sparse Row array |
|
A sparse array in COOrdinate format. |
|
Compressed Sparse Column array |
|
Compressed Sparse Row array |
|
Sparse array with DIAgonal storage |
|
Dictionary Of Keys based sparse array. |
|
Row-based list of lists sparse array |
Sparse matrix classes#
|
Block Sparse Row matrix |
|
A sparse matrix in COOrdinate format. |
|
Compressed Sparse Column matrix |
|
Compressed Sparse Row matrix |
|
Sparse matrix with DIAgonal storage |
|
Dictionary Of Keys based sparse matrix. |
|
Row-based list of lists sparse matrix |
|
This class provides a base class for all sparse matrices. |
Functions#
Building sparse matrices:
|
Sparse matrix with ones on diagonal |
|
Identity matrix in sparse format |
|
kronecker product of sparse matrices A and B |
|
kronecker sum of sparse matrices A and B |
|
Construct a sparse matrix from diagonals. |
|
Return a sparse matrix from diagonals. |
|
Build a block diagonal sparse matrix from provided matrices. |
|
Return the lower triangular portion of a matrix in sparse format |
|
Return the upper triangular portion of a matrix in sparse format |
|
Build a sparse matrix from sparse sub-blocks |
|
Stack sparse matrices horizontally (column wise) |
|
Stack sparse matrices vertically (row wise) |
|
Generate a sparse matrix of the given shape and density with uniformly distributed values. |
|
Generate a sparse matrix of the given shape and density with randomly distributed values. |
Save and load sparse matrices:
|
Save a sparse matrix to a file using |
|
Load a sparse matrix from a file using |
Sparse matrix tools:
|
Return the indices and values of the nonzero elements of a matrix |
Identifying sparse matrices:
|
Is x of a sparse matrix type? |
|
Is x of a sparse matrix type? |
Is x of csc_matrix type? |
|
Is x of csr_matrix type? |
|
Is x of a bsr_matrix type? |
|
Is x of lil_matrix type? |
|
Is x of dok_matrix type? |
|
Is x of coo_matrix type? |
|
Is x of dia_matrix type? |
Submodules#
Compressed sparse graph routines (scipy.sparse.csgraph) |
|
Sparse linear algebra (scipy.sparse.linalg) |
Exceptions#
Usage information#
There are seven available sparse matrix types:
csc_matrix: Compressed Sparse Column format
csr_matrix: Compressed Sparse Row format
bsr_matrix: Block Sparse Row format
lil_matrix: List of Lists format
dok_matrix: Dictionary of Keys format
coo_matrix: COOrdinate format (aka IJV, triplet format)
dia_matrix: DIAgonal format
To construct a matrix efficiently, use either dok_matrix or lil_matrix. The lil_matrix class supports basic slicing and fancy indexing with a similar syntax to NumPy arrays. As illustrated below, the COO format may also be used to efficiently construct matrices. Despite their similarity to NumPy arrays, it is strongly discouraged to use NumPy functions directly on these matrices because NumPy may not properly convert them for computations, leading to unexpected (and incorrect) results. If you do want to apply a NumPy function to these matrices, first check if SciPy has its own implementation for the given sparse matrix class, or convert the sparse matrix to a NumPy array (e.g., using the toarray() method of the class) first before applying the method.
To perform manipulations such as multiplication or inversion, first convert the matrix to either CSC or CSR format. The lil_matrix format is row-based, so conversion to CSR is efficient, whereas conversion to CSC is less so.
All conversions among the CSR, CSC, and COO formats are efficient, linear-time operations.
Matrix vector product#
To do a vector product between a sparse matrix and a vector simply use the matrix dot method, as described in its docstring:
>>> import numpy as np
>>> from scipy.sparse import csr_matrix
>>> A = csr_matrix([[1, 2, 0], [0, 0, 3], [4, 0, 5]])
>>> v = np.array([1, 0, -1])
>>> A.dot(v)
array([ 1, -3, -1], dtype=int64)
Warning
As of NumPy 1.7, np.dot is not aware of sparse matrices, therefore using it will result on unexpected results or errors. The corresponding dense array should be obtained first instead:
>>> np.dot(A.toarray(), v)
array([ 1, -3, -1], dtype=int64)
but then all the performance advantages would be lost.
The CSR format is specially suitable for fast matrix vector products.
Example 1#
Construct a 1000x1000 lil_matrix and add some values to it:
>>> from scipy.sparse import lil_matrix
>>> from scipy.sparse.linalg import spsolve
>>> from numpy.linalg import solve, norm
>>> from numpy.random import rand
>>> A = lil_matrix((1000, 1000))
>>> A[0, :100] = rand(100)
>>> A[1, 100:200] = A[0, :100]
>>> A.setdiag(rand(1000))
Now convert it to CSR format and solve A x = b for x:
>>> A = A.tocsr()
>>> b = rand(1000)
>>> x = spsolve(A, b)
Convert it to a dense matrix and solve, and check that the result is the same:
>>> x_ = solve(A.toarray(), b)
Now we can compute norm of the error with:
>>> err = norm(x-x_)
>>> err < 1e-10
True
It should be small :)
Example 2#
Construct a matrix in COO format:
>>> from scipy import sparse
>>> from numpy import array
>>> I = array([0,3,1,0])
>>> J = array([0,3,1,2])
>>> V = array([4,5,7,9])
>>> A = sparse.coo_matrix((V,(I,J)),shape=(4,4))
Notice that the indices do not need to be sorted.
Duplicate (i,j) entries are summed when converting to CSR or CSC.
>>> I = array([0,0,1,3,1,0,0])
>>> J = array([0,2,1,3,1,0,0])
>>> V = array([1,1,1,1,1,1,1])
>>> B = sparse.coo_matrix((V,(I,J)),shape=(4,4)).tocsr()
This is useful for constructing finite-element stiffness and mass matrices.
Further details#
CSR column indices are not necessarily sorted. Likewise for CSC row indices. Use the .sorted_indices() and .sort_indices() methods when sorted indices are required (e.g., when passing data to other libraries).