W-Markov measures, transfer operators, wavelets and multiresolutions

Abstract

In a general setting we solve the following inverse problem: Given a positive operators R, acting on measurable functions on a fixed measure space (X, BX), we construct an associated Markov chain. Specifically, starting with a choice of R (the transfer operator), and a probability measure μ0 on (X, BX), we then build an associated Markov chain T0, T1, T2,…, with these random variables (r.v) realized in a suitable probability space (, F, P), and each r.v. taking values in X, and with T0 having the probability μ0 as law. We further show how spectral data for R, e.g., the presence of R-harmonic functions, propagate to the Markov chain. Conversely, in a general setting, we show that every Markov chain is determined by its transfer operator. In a range of examples we put this correspondence into practical terms: (i) iterated function systems (IFS), (ii) wavelet multiresolution constructions, and (iii) IFSs with random control.