Title of article
Block SOR for Kronecker structured representations Original Research Article
Author/Authors
Peter Buchholz، نويسنده , , Tuimagerul Dayar، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2004
Pages
27
From page
83
To page
109
Abstract
The Kronecker structure of a hierarchical Markovian model (HMM) induces nested block partitionings in the transition matrix of its underlying Markov chain. This paper shows how sparse real Schur factors of certain diagonal blocks of a given partitioning induced by the Kronecker structure can be constructed from smaller component matrices and their real Schur factors. Furthermore, it shows how the column approximate minimum degree (COLAMD) ordering algorithm can be used to reduce fill-in of the remaining diagonal blocks that are sparse LU factorized. Combining these ideas, the paper proposes three-level block successive over-relaxation (BSOR) as a competitive steady state solver for HMMs. Finally, on a set of numerical experiments it demonstrates how these ideas reduce storage required by the factors of the diagonal blocks and improve solution time compared to an all LU factorization implementation of the BSOR solver.
Keywords
Real Schur factorization , COLAMD ordering , Markov chains , Kronecker based numerical techniques , Block SOR
Journal title
Linear Algebra and its Applications
Serial Year
2004
Journal title
Linear Algebra and its Applications
Record number
824488
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