標題: Patterns generation and transition matrices in multi-dimensional lattice models
作者: Ban, JC
Lin, SS
應用數學系
Department of Applied Mathematics
關鍵字: lattice dynamical systems;spatial entropy;pattern generation;transition matrix;ordering matrix
公開日期: 1-八月-2005
摘要: In this paper we develop a general approach for investigating pattern generation problems in multi-dimensional lattice models. Let S be a set of p symbols or colors, Z(N) a fixed finite rectangular sublattice of Z(d), d >= 1 and N a d-tuple of positive integers. Functions U : Z(d) --> S and U-N : Z(N) --> S are called a global pattern and a local pattern on ZN, respectively. We introduce an ordering matrix X-N for Sigma(N), the set of all local patterns on Z(N). For a larger finite lattice Z((N) over tilde) (N) over tilde >= N, we derive a recursion formula to obtain the ordering matrix X-(N) over tilde of Sigma((N) over tilde) from XN. For a given basic admissible local patterns set 13 C Ely, the transition matrix T-N(B) is defined. For each (N) over tilde >= N denoted by Sigma((N) over tilde)(B) the set of all local patterns which can be generated from B, the cardinal number of Sigma((N) over tilde)(B) is the sum of entries of the transition matrix T-(N) over tilde(B) which can be obtained from T-N(B) recursively. The spatial entropy h(B) can be obtained by computing the maximum eigenvalues of a sequence of transition matrices T-n(B). The results can be applied to study the set of global stationary solutions in various Lattice Dynamical Systems and Cellular Neural Networks.
URI: http://hdl.handle.net/11536/13452
ISSN: 1078-0947
期刊: DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS
Volume: 13
Issue: 3
起始頁: 637
結束頁: 658
顯示於類別:期刊論文