Computing Valuations of the DieudonnΓ© Determinants

July 10, 2019 Β· Declared Dead Β· πŸ› arXiv.org

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Authors Taihei Oki arXiv ID 1907.04512 Category cs.DS: Data Structures & Algorithms Cross-listed cs.SC Citations 3 Venue arXiv.org Last Checked 4 months ago
Abstract
This paper addresses the problem of computing valuations of the DieudonnΓ© determinants of matrices over discrete valuation skew fields (DVSFs). Under a reasonable computational model, we propose two algorithms for a class of DVSFs, called split. Our algorithms are extensions of the combinatorial relaxation of Murota (1995) and the matrix expansion by Moriyama--Murota (2013), both of which are based on combinatorial optimization. While our algorithms require an upper bound on the output, we give an estimation of the bound for skew polynomial matrices and show that the estimation is valid only for skew polynomial matrices. We consider two applications of this problem. The first one is the noncommutative weighted Edmonds' problem (nc-WEP), which is to compute the degree of the DieudonnΓ© determinants of matrices having noncommutative symbols. We show that the presented algorithms reduce the nc-WEP to the unweighted problem in polynomial time. In particular, we show that the nc-WEP over the rational field is solvable in time polynomial in the input bit-length. We also present an application to analyses of degrees of freedom of linear time-varying systems by establishing formulas on the solution spaces of linear differential/difference equations.
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