The Crossed Product by a Partial Endomorphism and the Covariance Algebra
Abstract
Given a local homeomorphism σ:U -> X where U is a clopen subset of an compact and Hausdorff topological space X, we obtain the possible transfer operators L which may occur for :C(X) -> C(U) given by (f)=fσ. We obtain examples of partial dynamical systems (XA,σA) such that the construction of the covariance algebra C*(XA,σA) and the crossed product by partial endomorphism O(XA,,L) associated to this system are not equivalent, in the sense that there does not exists invertible function in C(U) such that O(XA,,L)=C*(XA,σ).
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