English

Linear Dynamical Systems over Finite Rings

Dynamical Systems 2008-10-20 v1 Commutative Algebra

Abstract

The problem of linking the structure of a finite linear dynamical system with its dynamics is well understood when the phase space is a vector space over a finite field. The cycle structure of such a system can be described by the elementary divisors of the linear function, and the problem of determining whether the system is a fixed point system can be answered by computing and factoring the system's characteristic polynomial and minimal polynomial. It has become clear recently that the study of finite linear dynamical systems must be extended to embrace finite rings. The difficulty of dealing with an arbitrary finite commutative ring is that it lacks of unique factorization. In this paper, an efficient algorithm is provided for analyzing the cycle structure of a linear dynamical system over a finite commutative ring. In particular, for a given commutative ring RR such that R=q|R|=q, where qq is a positive integer, the algorithm determines whether a given linear system over RnR^n is a fixed point system or not in time O(n3log(nlog(q)))O(n^3\log(n\log(q))).

Keywords

Cite

@article{arxiv.0810.3164,
  title  = {Linear Dynamical Systems over Finite Rings},
  author = {Guangwu Xu and Yi Ming Zou},
  journal= {arXiv preprint arXiv:0810.3164},
  year   = {2008}
}

Comments

To appear in Journal of Algebra (Computational Section). Code for the algorithm is available upon request

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