I want to check if a matrix is positive or semipositive definite using Python.
How can I do that? Is there a dedicated function in scipy for that or in other modules?
I want to check if a matrix is positive or semipositive definite using Python. How can I do that? Is there a dedicated function in scipy for that or in other modules? 


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 matrixvector multiplications to test "directly". 


Cholesky decomposition is a good option if you're working with positive definite (PD) matrices. However, it throws the following error on positive semidefinite (PSD) matrix, say,
For PSD matrices, you can use scipy/numpy's eigh() to check that all eigenvalues are nonnegative.
However, you will most probably encounter numerical stability issues. To overcome those, you can use the following function.
Which returns True on matrices that are approximately PSD up to a given tolerance. 


Check whether the whole eigenvalues of a symmetric matrix
A are nonnegative is timeconsuming if A is very large, while the module scipy.sparse.linalg.arpack provides a good solution since one can customize the returned eigenvalues by specifying parameters.(see Scipy.sparse.linalg.arpack for more information)
As we know if both ends of the spectrum of
By this we only need to calculate two eigenvalues to check PSD, I think it's very useful for large 


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


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

