Entropy rate of product of independent processes

Abstract

We study the multiplicative version of the classical Furstenberg's filtering problem, where instead of the sum X+Y one considers the product X· Y (X and Y are bilateral, real, finitely-valued, stationary independent processes, Y is taking values in \0,1\). We provide formulas for H(X·Y|Y). As a consequence, we show that if H(X)>H(Y)=0 and X Y, then H(X· Y)<H(X) (and thus X cannot be filtered out from X·Y) whenever X is not bilaterally deterministic, Y is ergodic and Y first return to 1 can take arbitrarily long with positive probability. On the other hand, if almost surely Y visits 1 along an infinite arithmetic progression of a fixed difference (with possibly some more visits in between) then we can find X that is not bilaterally deterministic and such that H(X·Y)=H(X). As a consequence, a B-free system (Xη,S) is proximal if and only if there is always an entropy drop h(η)<h() for any corresponding to a non-bilaterally deterministic process of positive entropy. These results partly settle some open problems on invariant measures for B-free systems.