Dynamical properties of endomorphisms, multiresolutions, similarity-and orthogonality relations

Abstract

We study positive transfer operators R in the setting of general measure spaces (X,B). For each R, we compute associated path-space probability spaces (,P). When the transfer operator R is compatible with an endomorphism in (X,B), we get associated multiresolutions for the Hilbert spaces L2(,P) where the path-space may then be taken to be a solenoid. Our multiresolutions include both orthogonality relations and self-similarity algorithms for standard wavelets and for generalized wavelet-resolutions. Applications are given to topological dynamics, ergodic theory, and spectral theory, in general; to iterated function systems (IFSs), and to Markov chains in particular.