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I want to check if a matrix is positive or semi-positive definite using Python.

How can I do that? Is there a dedicated function in scipy for that or in other modules?

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"definite" not "difinite" –  Curd Apr 6 '11 at 9:11

4 Answers 4

I assume you already know your matrix is symmetric.

A good test for positive definiteness (actually the standard one !) is to try to compute its Cholesky factorization. It succeeds iff your matrix is positive definite.

This is the most direct way, since it needs O(n^3) operations (with a small constant), and you would need at least n matrix-vector multiplications to test "directly".

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i was asking if there is a direct method for that. Thanks anyway –  sramij Apr 6 '11 at 11:58
3  
@sramij this is the most direct way to test –  David Heffernan Apr 6 '11 at 12:15
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@sramij: This is a direct method, and is faster than anything else, unless you have additional a priori information about the matrix. –  Stephen Canon Apr 6 '11 at 18:14
1  
For the positive semi-definite case it remains true as an abstract proposition that a real symmetric (or complex Hermitian) matrix is positive semi-definite if and only if a Cholesky factorization exists. With a positive definite matrix the usual algorithm succeeds because all the diagonal entries of L s.t. A =LL' are positive (a square root being taken). If we hit a zero pivot, the computation halts, but the theory holds. –  hardmath Apr 6 '11 at 23:57
    
@hardmath: indeed, the existence of the cholesky decomposition for semidefinite matrices holds by a limiting argument. –  Alexandre C. Apr 7 '11 at 7:13

Cholesky decomposition is a good option if you're working with positive definite (PD) matrices.

However, it throws the following error on positive semi-definite (PSD) matrix, say,

A = np.zeros((3,3)) // the all-zero matrix is a PSD matrix
np.linalg.cholesky(A)
LinAlgError: Matrix is not positive definite -
Cholesky decomposition cannot be computed

For PSD matrices, you can use scipy/numpy's eigh() to check that all eigenvalues are non-negative.

>> E,V = scipy.linalg.eigh(np.zeros((3,3)))
>> E
array([ 0.,  0.,  0.])

However, you will most probably encounter numerical stability issues. To overcome those, you can use the following function.

def isPSD(A, tol=1e-8):
  E,V = scipy.linalg.eigh(A)
  return np.all(E > -tol)

Which returns True on matrices that are approximately PSD up to a given tolerance.

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Actually, you can probably accelerate isPSD() by replacing eigh() with eigvalsh() which only computes the eigenvalues (I have not tested this). –  Tomer Jun 23 '13 at 22:29
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I believe that scipy.linalg.eigh(A) should be altered to np.linalg.eigh(A) –  Vincent Russo Aug 4 at 20:05

an easier method is to calculate the determinants of the minors for this matrx.

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Computing the determinants requires n LU/QR/Cholesky decompositions, so just checking if Cholesky of the whole matrix succeeds should be faster. –  pv. Apr 6 '11 at 13:21
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It is true that a real symmetric (resp. complex Hermitian) matrix is positive semi-definite if and only if all its principal minors are nonnegative. See the note by John Prussing here correcting the misstatement sometimes made that it suffices to check the leading principal minors are nonnegative. The latter is necessary but not sufficient for positive semi-definiteness. –  hardmath Apr 7 '11 at 0:10
up vote -1 down vote accepted

One good solution is to calculate all the minors of determinants and check they are all non negatives.

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