Abstract :
Given a local homeomorphism σ :U →X where U ⊆ X is clopen and X is a compact and Hausdorff
topological space, we obtain the possible transfer operators Lρ which may occur for α :C(X)→C(U)
given by α(f ) = f ◦ σ. We obtain examples of partial dynamical systems (XA,σA) such that the construction
of the covariance algebra C∗(XA,σA), proposed by B.K. Kwasniewski, and the crossed product
by a partial endomorphism O(XA,α,L), recently introduced by the author and R. Exel, associated to this
system are not equivalent, in the sense that there does not exist an invertible function ρ ∈ C(U) such that
O(XA,α,Lρ)∼=
C∗(XA,σA).
© 2005 Elsevier Inc. All rights reserved.
