Boundary complexity and surface entropy of 2-multiplicative integer systems on Nd

Abstract

In this article, we introduce the concept of the boundary complexity and prove that for a 2-multiplicative integer system (2-MIS) Xp on N (or X p on Nd,d≥ 2), every point in [h(Xp), r] can be realized as a boundary complexity of a 2-MIS with a specific speed, where r stands for the number of the alphabets. The result is new and quite different from Nd subshifts of finite type (SFT) for d≥ 1. Furthermore, the rigorous formula of surface entropy for a Nd 2-MIS is also presented. This provides an efficient method to calculate the topological entropy for Nd 2-MIS and also provides an intrinsic differences between Nd k-MIS and SFTs for d≥ 1 and k≥ 2.