Justifications of spatial entropies of multi-dimensional symbolic dynamical systems

Abstract

The commonly used spatial entropy hr(U) of the multi-dimensional shift space U is the limit of growth rate of admissible local patterns on finite rectangular sublattices which expands to whole space Zd, d≥ 2. This work studies spatial entropy h(U) of shift space U on general expanding system =\(n)\n=1∞ where (n) is increasing finite sublattices and expands to Zd. is called genuinely d-dimensional if (n) contains no lower-dimensional part whose size is comparable to that of its d-dimensional part. We show that hr(U) is the supremum of h(U) for all genuinely two-dimensional . Furthermore, when is genuinely d-dimensional and satisfies certain conditions, then h(U)=hr(U). On the contrary, when (n) contains a lower-dimensional part, then hr(U)<h(U) for some U. Therefore, hr(U) is appropriate to be the d-dimensional spatial entropy.