On the entropy and index of the winding endomorphisms of p-adic ring C*-algebras

Abstract

For p≥ 2, the p-adic ring C*-algebra Qp is the universal C*-algebra generated by a unitary U and an isometry Sp such that SpU=UpSp and Σl=0p-1UlSpSp*U-l=1. For any k coprime with p we define an endomorphism k∈ End(Qp) by setting k(U):=Uk and k(Sp):=Sp. We then compute the entropy of k, which turns out to be |k|. Finally, for selected values of k we also compute the Watatani index of k showing that the entropy is the natural logarithm of the index.