Arbitrary real power of a matrix by Schur-Pade algorithm

Computing an arbitrary real power of a square matrix by a Schur-Pade algorithm.
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Updated 24 Feb 2011

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X = POWERM_PADE(A,P) computes the P'th power X of the matrix A, for arbitrary real P and A with no nonpositive real eigenvalues, by the Schur-Pade algorithm. [X,NSQ,M] = POWERM_PADE(A, P) returns the number NSQ of matrix square roots computed and the degree M of the Pade approximant used.

If A is singular or has any eigenvalues on the negative real axis, a warning message is printed.

Function TEST.M runs a simple test of the codes.

Details on the underlying algorithms can be found in

N. J. Higham and L. Lin. A Schur--Pade algorithm for fractional powers of a matrix. MIMS EPrint 2010.91, Manchester Institute for Mathematical Sciences, The University of Manchester, UK, Oct. 2010; revised Feb. 2011.
http://eprints.ma.man.ac.uk/1589/

Cite As

Nick Higham (2024). Arbitrary real power of a matrix by Schur-Pade algorithm (https://www.mathworks.com/matlabcentral/fileexchange/30527-arbitrary-real-power-of-a-matrix-by-schur-pade-algorithm), MATLAB Central File Exchange. Retrieved .

MATLAB Release Compatibility
Created with R2010b
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Version Published Release Notes
1.0.0.0