Computations on Sofic S-gap Shifts

Abstract

Let S=\sn\ be an increasing finite or infinite subset of N \0\ and X(S) the S-gap shift associated to S. Let fS(x)=1-Σ1xsn+1 be the entropy function which will be vanished at 2h(X(S)) where h(X(S)) is the entropy of the system. Suppose X(S) is sofic with adjacency matrix A and the characteristic polynomial A. Then for some rational function QS , A(x)=QS(x)fS(x). This QS will be explicitly determined. We will show that ζ(t)=1fS(t-1) or ζ(t)=1(1-t)fS(t-1) when |S|<∞ or |S|=∞ respectively. Here ζ is the zeta function of X(S). We will also compute the Bowen-Franks groups of a sofic S-gap shift.