Transitivity And Related Notions For Graph Induced Symbolic Systems

Abstract

In this paper, we investigate the dynamical behavior of a two dimensional shift XG (generated by a two dimensional graph G=(H,V)) using the adjacency matrices of the generating graph G. In particular, we investigate properties such as transitivity, directional transitivity, weak mixing, directional weak mixing and mixing for the shift space XG. We prove that if (HV)ij≠ 0 (VH)ij≠ 0 (for all i,j), while doubly transitivity (weak mixing) of XH (or XV) ensures the same for two dimensional shift generated by the graph G, directional transitivity (in the direction (r,s)) can be characterized through the block representation of HrVs. We provide necessary and sufficient criteria to establish horizontal (vertical) transitivity for the shift space XG. We also provide examples to establish the necessity of the conditions imposed. Finally, we investigate the decomposability of a given graph into product of graphs with reduced complexity.

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