import math import numpy as np from scipy.misc import comb __all__ = ['tri', 'tril', 'triu', 'toeplitz', 'circulant', 'hankel', 'hadamard', 'leslie', 'all_mat', 'kron', 'block_diag', 'companion', 'hilbert', 'invhilbert', 'pascal'] #----------------------------------------------------------------------------- # matrix construction functions #----------------------------------------------------------------------------- # # *Note*: tri{,u,l} is implemented in numpy, but an important bug was fixed in # 2.0.0.dev-1af2f3, the following tri{,u,l} definitions are here for backwards # compatibility. def tri(N, M=None, k=0, dtype=None): """ Construct (N, M) matrix filled with ones at and below the k-th diagonal. The matrix has A[i,j] == 1 for i <= j + k Parameters ---------- N : integer The size of the first dimension of the matrix. M : integer or None The size of the second dimension of the matrix. If `M` is None, `M = N` is assumed. k : integer Number of subdiagonal below which matrix is filled with ones. `k` = 0 is the main diagonal, `k` < 0 subdiagonal and `k` > 0 superdiagonal. dtype : dtype Data type of the matrix. Returns ------- A : array, shape (N, M) Examples -------- >>> from scipy.linalg import tri >>> tri(3, 5, 2, dtype=int) array([[1, 1, 1, 0, 0], [1, 1, 1, 1, 0], [1, 1, 1, 1, 1]]) >>> tri(3, 5, -1, dtype=int) array([[0, 0, 0, 0, 0], [1, 0, 0, 0, 0], [1, 1, 0, 0, 0]]) """ if M is None: M = N if type(M) == type('d'): #pearu: any objections to remove this feature? # As tri(N,'d') is equivalent to tri(N,dtype='d') dtype = M M = N m = np.greater_equal(np.subtract.outer(np.arange(N), np.arange(M)), -k) if dtype is None: return m else: return m.astype(dtype) def tril(m, k=0): """Make a copy of a matrix with elements above the k-th diagonal zeroed. Parameters ---------- m : array Matrix whose elements to return k : integer Diagonal above which to zero elements. k == 0 is the main diagonal, k < 0 subdiagonal and k > 0 superdiagonal. Returns ------- A : array, shape m.shape, dtype m.dtype Examples -------- >>> from scipy.linalg import tril >>> tril([[1,2,3],[4,5,6],[7,8,9],[10,11,12]], -1) array([[ 0, 0, 0], [ 4, 0, 0], [ 7, 8, 0], [10, 11, 12]]) """ m = np.asarray(m) out = tri(m.shape[0], m.shape[1], k=k, dtype=m.dtype.char) * m return out def triu(m, k=0): """Make a copy of a matrix with elements below the k-th diagonal zeroed. Parameters ---------- m : array Matrix whose elements to return k : integer Diagonal below which to zero elements. k == 0 is the main diagonal, k < 0 subdiagonal and k > 0 superdiagonal. Returns ------- A : array, shape m.shape, dtype m.dtype Examples -------- >>> from scipy.linalg import triu >>> triu([[1,2,3],[4,5,6],[7,8,9],[10,11,12]], -1) array([[ 1, 2, 3], [ 4, 5, 6], [ 0, 8, 9], [ 0, 0, 12]]) """ m = np.asarray(m) out = (1 - tri(m.shape[0], m.shape[1], k - 1, m.dtype.char)) * m return out def toeplitz(c, r=None): """ Construct a Toeplitz matrix. The Toeplitz matrix has constant diagonals, with c as its first column and r as its first row. If r is not given, ``r == conjugate(c)`` is assumed. Parameters ---------- c : array_like First column of the matrix. Whatever the actual shape of `c`, it will be converted to a 1-D array. r : array_like First row of the matrix. If None, ``r = conjugate(c)`` is assumed; in this case, if c[0] is real, the result is a Hermitian matrix. r[0] is ignored; the first row of the returned matrix is ``[c[0], r[1:]]``. Whatever the actual shape of `r`, it will be converted to a 1-D array. Returns ------- A : array, shape (len(c), len(r)) The Toeplitz matrix. Dtype is the same as ``(c[0] + r[0]).dtype``. See also -------- circulant : circulant matrix hankel : Hankel matrix Notes ----- The behavior when `c` or `r` is a scalar, or when `c` is complex and `r` is None, was changed in version 0.8.0. The behavior in previous versions was undocumented and is no longer supported. Examples -------- >>> from scipy.linalg import toeplitz >>> toeplitz([1,2,3], [1,4,5,6]) array([[1, 4, 5, 6], [2, 1, 4, 5], [3, 2, 1, 4]]) >>> toeplitz([1.0, 2+3j, 4-1j]) array([[ 1.+0.j, 2.-3.j, 4.+1.j], [ 2.+3.j, 1.+0.j, 2.-3.j], [ 4.-1.j, 2.+3.j, 1.+0.j]]) """ c = np.asarray(c).ravel() if r is None: r = c.conjugate() else: r = np.asarray(r).ravel() # Form a 1D array of values to be used in the matrix, containing a reversed # copy of r[1:], followed by c. vals = np.concatenate((r[-1:0:-1], c)) a, b = np.ogrid[0:len(c), len(r) - 1:-1:-1] indx = a + b # `indx` is a 2D array of indices into the 1D array `vals`, arranged so # that `vals[indx]` is the Toeplitz matrix. return vals[indx] def circulant(c): """ Construct a circulant matrix. Parameters ---------- c : array_like 1-D array, the first column of the matrix. Returns ------- A : array, shape (len(c), len(c)) A circulant matrix whose first column is `c`. See also -------- toeplitz : Toeplitz matrix hankel : Hankel matrix Notes ----- .. versionadded:: 0.8.0 Examples -------- >>> from scipy.linalg import circulant >>> circulant([1, 2, 3]) array([[1, 3, 2], [2, 1, 3], [3, 2, 1]]) """ c = np.asarray(c).ravel() a, b = np.ogrid[0:len(c), 0:-len(c):-1] indx = a + b # `indx` is a 2D array of indices into `c`, arranged so that `c[indx]` is # the circulant matrix. return c[indx] def hankel(c, r=None): """ Construct a Hankel matrix. The Hankel matrix has constant anti-diagonals, with `c` as its first column and `r` as its last row. If `r` is not given, then `r = zeros_like(c)` is assumed. Parameters ---------- c : array_like First column of the matrix. Whatever the actual shape of `c`, it will be converted to a 1-D array. r : array_like, 1D Last row of the matrix. If None, ``r = zeros_like(c)`` is assumed. r[0] is ignored; the last row of the returned matrix is ``[c[-1], r[1:]]``. Whatever the actual shape of `r`, it will be converted to a 1-D array. Returns ------- A : array, shape (len(c), len(r)) The Hankel matrix. Dtype is the same as ``(c[0] + r[0]).dtype``. See also -------- toeplitz : Toeplitz matrix circulant : circulant matrix Examples -------- >>> from scipy.linalg import hankel >>> hankel([1, 17, 99]) array([[ 1, 17, 99], [17, 99, 0], [99, 0, 0]]) >>> hankel([1,2,3,4], [4,7,7,8,9]) array([[1, 2, 3, 4, 7], [2, 3, 4, 7, 7], [3, 4, 7, 7, 8], [4, 7, 7, 8, 9]]) """ c = np.asarray(c).ravel() if r is None: r = np.zeros_like(c) else: r = np.asarray(r).ravel() # Form a 1D array of values to be used in the matrix, containing `c` # followed by r[1:]. vals = np.concatenate((c, r[1:])) a, b = np.ogrid[0:len(c), 0:len(r)] indx = a + b # `indx` is a 2D array of indices into the 1D array `vals`, arranged so # that `vals[indx]` is the Hankel matrix. return vals[indx] def hadamard(n, dtype=int): """ Construct a Hadamard matrix. `hadamard(n)` constructs an n-by-n Hadamard matrix, using Sylvester's construction. `n` must be a power of 2. Parameters ---------- n : int The order of the matrix. `n` must be a power of 2. dtype : numpy dtype The data type of the array to be constructed. Returns ------- H : ndarray with shape (n, n) The Hadamard matrix. Notes ----- .. versionadded:: 0.8.0 Examples -------- >>> from scipy.linalg import hadamard >>> hadamard(2, dtype=complex) array([[ 1.+0.j, 1.+0.j], [ 1.+0.j, -1.-0.j]]) >>> hadamard(4) array([[ 1, 1, 1, 1], [ 1, -1, 1, -1], [ 1, 1, -1, -1], [ 1, -1, -1, 1]]) """ # This function is a slightly modified version of the # function contributed by Ivo in ticket #675. if n < 1: lg2 = 0 else: lg2 = int(math.log(n, 2)) if 2 ** lg2 != n: raise ValueError("n must be an positive integer, and n must be " "a power of 2") H = np.array([[1]], dtype=dtype) # Sylvester's construction for i in range(0, lg2): H = np.vstack((np.hstack((H, H)), np.hstack((H, -H)))) return H def leslie(f, s): """ Create a Leslie matrix. Given the length n array of fecundity coefficients `f` and the length n-1 array of survival coefficents `s`, return the associated Leslie matrix. Parameters ---------- f : array_like The "fecundity" coefficients, has to be 1-D. s : array_like The "survival" coefficients, has to be 1-D. The length of `s` must be one less than the length of `f`, and it must be at least 1. Returns ------- L : ndarray Returns a 2-D ndarray of shape ``(n, n)``, where `n` is the length of `f`. The array is zero except for the first row, which is `f`, and the first sub-diagonal, which is `s`. The data-type of the array will be the data-type of ``f[0]+s[0]``. Notes ----- .. versionadded:: 0.8.0 The Leslie matrix is used to model discrete-time, age-structured population growth [1]_ [2]_. In a population with `n` age classes, two sets of parameters define a Leslie matrix: the `n` "fecundity coefficients", which give the number of offspring per-capita produced by each age class, and the `n` - 1 "survival coefficients", which give the per-capita survival rate of each age class. References ---------- .. [1] P. H. Leslie, On the use of matrices in certain population mathematics, Biometrika, Vol. 33, No. 3, 183--212 (Nov. 1945) .. [2] P. H. Leslie, Some further notes on the use of matrices in population mathematics, Biometrika, Vol. 35, No. 3/4, 213--245 (Dec. 1948) Examples -------- >>> from scipy.linalg import leslie >>> leslie([0.1, 2.0, 1.0, 0.1], [0.2, 0.8, 0.7]) array([[ 0.1, 2. , 1. , 0.1], [ 0.2, 0. , 0. , 0. ], [ 0. , 0.8, 0. , 0. ], [ 0. , 0. , 0.7, 0. ]]) """ f = np.atleast_1d(f) s = np.atleast_1d(s) if f.ndim != 1: raise ValueError("Incorrect shape for f. f must be one-dimensional") if s.ndim != 1: raise ValueError("Incorrect shape for s. s must be one-dimensional") if f.size != s.size + 1: raise ValueError("Incorrect lengths for f and s. The length" " of s must be one less than the length of f.") if s.size == 0: raise ValueError("The length of s must be at least 1.") tmp = f[0] + s[0] n = f.size a = np.zeros((n, n), dtype=tmp.dtype) a[0] = f a[range(1, n), range(0, n - 1)] = s return a def all_mat(*args): return map(np.matrix, args) def kron(a, b): """Kronecker product of a and b. The result is the block matrix:: a[0,0]*b a[0,1]*b ... a[0,-1]*b a[1,0]*b a[1,1]*b ... a[1,-1]*b ... a[-1,0]*b a[-1,1]*b ... a[-1,-1]*b Parameters ---------- a : array, shape (M, N) b : array, shape (P, Q) Returns ------- A : array, shape (M*P, N*Q) Kronecker product of a and b Examples -------- >>> from numpy import array >>> from scipy.linalg import kron >>> kron(array([[1,2],[3,4]]), array([[1,1,1]])) array([[1, 1, 1, 2, 2, 2], [3, 3, 3, 4, 4, 4]]) """ if not a.flags['CONTIGUOUS']: a = np.reshape(a, a.shape) if not b.flags['CONTIGUOUS']: b = np.reshape(b, b.shape) o = np.outer(a, b) o = o.reshape(a.shape + b.shape) return np.concatenate(np.concatenate(o, axis=1), axis=1) def block_diag(*arrs): """ Create a block diagonal matrix from provided arrays. Given the inputs `A`, `B` and `C`, the output will have these arrays arranged on the diagonal:: [[A, 0, 0], [0, B, 0], [0, 0, C]] Parameters ---------- A, B, C, ... : array_like, up to 2-D Input arrays. A 1-D array or array_like sequence of length `n`is treated as a 2-D array with shape ``(1,n)``. Returns ------- D : ndarray Array with `A`, `B`, `C`, ... on the diagonal. `D` has the same dtype as `A`. Notes ----- If all the input arrays are square, the output is known as a block diagonal matrix. Examples -------- >>> from scipy.linalg import block_diag >>> A = [[1, 0], ... [0, 1]] >>> B = [[3, 4, 5], ... [6, 7, 8]] >>> C = [[7]] >>> block_diag(A, B, C) [[1 0 0 0 0 0] [0 1 0 0 0 0] [0 0 3 4 5 0] [0 0 6 7 8 0] [0 0 0 0 0 7]] >>> block_diag(1.0, [2, 3], [[4, 5], [6, 7]]) array([[ 1., 0., 0., 0., 0.], [ 0., 2., 3., 0., 0.], [ 0., 0., 0., 4., 5.], [ 0., 0., 0., 6., 7.]]) """ if arrs == (): arrs = ([],) arrs = [np.atleast_2d(a) for a in arrs] bad_args = [k for k in range(len(arrs)) if arrs[k].ndim > 2] if bad_args: raise ValueError("arguments in the following positions have dimension " "greater than 2: %s" % bad_args) shapes = np.array([a.shape for a in arrs]) out = np.zeros(np.sum(shapes, axis=0), dtype=arrs[0].dtype) r, c = 0, 0 for i, (rr, cc) in enumerate(shapes): out[r:r + rr, c:c + cc] = arrs[i] r += rr c += cc return out def companion(a): """ Create a companion matrix. Create the companion matrix [1]_ associated with the polynomial whose coefficients are given in `a`. Parameters ---------- a : array_like 1-D array of polynomial coefficients. The length of `a` must be at least two, and ``a[0]`` must not be zero. Returns ------- c : ndarray A square array of shape ``(n-1, n-1)``, where `n` is the length of `a`. The first row of `c` is ``-a[1:]/a[0]``, and the first sub-diagonal is all ones. The data-type of the array is the same as the data-type of ``1.0*a[0]``. Raises ------ ValueError If any of the following are true: a) ``a.ndim != 1``; b) ``a.size < 2``; c) ``a[0] == 0``. Notes ----- .. versionadded:: 0.8.0 References ---------- .. [1] R. A. Horn & C. R. Johnson, *Matrix Analysis*. Cambridge, UK: Cambridge University Press, 1999, pp. 146-7. Examples -------- >>> from scipy.linalg import companion >>> companion([1, -10, 31, -30]) array([[ 10., -31., 30.], [ 1., 0., 0.], [ 0., 1., 0.]]) """ a = np.atleast_1d(a) if a.ndim != 1: raise ValueError("Incorrect shape for `a`. `a` must be " "one-dimensional.") if a.size < 2: raise ValueError("The length of `a` must be at least 2.") if a[0] == 0: raise ValueError("The first coefficient in `a` must not be zero.") first_row = -a[1:] / (1.0 * a[0]) n = a.size c = np.zeros((n - 1, n - 1), dtype=first_row.dtype) c[0] = first_row c[range(1, n - 1), range(0, n - 2)] = 1 return c def hilbert(n): """Create a Hilbert matrix of order `n`. Returns the `n` by `n` array with entries `h[i,j] = 1 / (i + j + 1)`. Parameters ---------- n : int The size of the array to create. Returns ------- h : ndarray with shape (n, n) The Hilbert matrix. See Also -------- invhilbert : Compute the inverse of a Hilbert matrix. Notes ----- .. versionadded:: 0.10.0 Examples -------- >>> from scipy.linalg import hilbert >>> hilbert(3) array([[ 1. , 0.5 , 0.33333333], [ 0.5 , 0.33333333, 0.25 ], [ 0.33333333, 0.25 , 0.2 ]]) """ values = 1.0 / (1.0 + np.arange(2 * n - 1)) h = hankel(values[:n], r=values[n - 1:]) return h def invhilbert(n, exact=False): """Compute the inverse of the Hilbert matrix of order `n`. The entries in the inverse of a Hilbert matrix are integers. When `n` is greater than 14, some entries in the inverse exceed the upper limit of 64 bit integers. The `exact` argument provides two options for dealing with these large integers. Parameters ---------- n : int The order of the Hilbert matrix. exact : bool If False, the data type of the array that is returned is np.float64, and the array is an approximation of the inverse. If True, the array is the exact integer inverse array. To represent the exact inverse when n > 14, the returned array is an object array of long integers. For n <= 14, the exact inverse is returned as an array with data type np.int64. Returns ------- invh : ndarray with shape (n, n) The data type of the array is np.float64 if `exact` is False. If `exact` is True, the data type is either np.int64 (for n <= 14) or object (for n > 14). In the latter case, the objects in the array will be long integers. See Also -------- hilbert : Create a Hilbert matrix. Notes ----- .. versionadded:: 0.10.0 Examples -------- >>> from scipy.linalg import invhilbert >>> invhilbert(4) array([[ 16., -120., 240., -140.], [ -120., 1200., -2700., 1680.], [ 240., -2700., 6480., -4200.], [ -140., 1680., -4200., 2800.]]) >>> invhilbert(4, exact=True) array([[ 16, -120, 240, -140], [ -120, 1200, -2700, 1680], [ 240, -2700, 6480, -4200], [ -140, 1680, -4200, 2800]], dtype=int64) >>> invhilbert(16)[7,7] 4.2475099528537506e+19 >>> invhilbert(16, exact=True)[7,7] 42475099528537378560L """ if exact: if n > 14: dtype = object else: dtype = np.int64 else: dtype = np.float64 invh = np.empty((n, n), dtype=dtype) for i in xrange(n): for j in xrange(0, i + 1): s = i + j invh[i, j] = ((-1) ** s * (s + 1) * comb(n + i, n - j - 1, exact) * comb(n + j, n - i - 1, exact) * comb(s, i, exact) ** 2) if i != j: invh[j, i] = invh[i, j] return invh def pascal(n, kind='symmetric', exact=True): """Returns the n x n Pascal matrix. The Pascal matrix is a matrix containing the binomial coefficients as its elements. Parameters ---------- n : int The size of the matrix to create; that is, the result is an n x n matrix. kind : str, optional Must be one of 'symmetric', 'lower', or 'upper'. Default is 'symmetric'. exact : bool, optional If `exact` is True, the result is either an array of type numpy.uint64 (if n <= 35) or an object array of Python long integers. If `exact` is False, the coefficients in the matrix are computed using `scipy.misc.comb` with `exact=False`. The result will be a floating point array, and the values in the array will not be the exact coefficients, but this version is much faster than `exact=True`. Returns ------- p : 2-D ndarray The Pascal matrix. Notes ----- .. versionadded:: 0.11.0 See http://en.wikipedia.org/wiki/Pascal_matrix for more information about Pascal matrices. Examples -------- >>> from scipy.linalg import pascal >>> pascal(4) array([[ 1, 1, 1, 1], [ 1, 2, 3, 4], [ 1, 3, 6, 10], [ 1, 4, 10, 20]], dtype=uint64) >>> pascal(4, kind='lower') array([[1, 0, 0, 0], [1, 1, 0, 0], [1, 2, 1, 0], [1, 3, 3, 1]], dtype=uint64) >>> pascal(50)[-1, -1] 25477612258980856902730428600L >>> from scipy.misc import comb >>> comb(98, 49, exact=True) 25477612258980856902730428600L """ if kind not in ['symmetric', 'lower', 'upper']: raise ValueError("kind must be 'symmetric', 'lower', or 'upper'") if exact: if n > 35: L_n = np.empty((n, n), dtype=object) L_n.fill(0L) else: L_n = np.zeros((n, n), dtype=np.uint64) for i in range(n): for j in range(i + 1): L_n[i, j] = comb(i, j, exact=True) else: L_n = comb(*np.ogrid[:n, :n]) if kind is 'lower': p = L_n elif kind is 'upper': p = L_n.T else: p = np.dot(L_n, L_n.T) return p