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On computing the symplectic $LL^T$ factorization

We analyze two algorithms for computing the symplectic $LL^T$ factorization $A=LL^T$ of a given symmetric positive definite symplectic matrix $A$. The first algorithm $W_1$ is an implementation of the $HH^T$ factorization from [Dopico et al., 2009], see Theorem 5.2. The second one, algorithm $W_2$ uses both Cholesky and Reverse Cholesky decompositions of symmetric positive definite matrices. We presents a comparison of these algorithms and illustrate their properties by numerical experiments in MATLAB. A particular emphasis is given on simplecticity properties of the computed matrices in floating-point arithmetic.

preprint2022arXivOpen access
Maksymilian BujokAlicja SmoktunowiczGrzegorz Borowik
math.NANumerical Analysis
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Maksymilian BujokAlicja SmoktunowiczGrzegorz Borowik

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