On infinitely cohomologous to zero observables

Abstract

We show that for a large class of piecewise expanding maps T, the bounded p-variation observables u0 that admits an infinite sequence of bounded p-variation observables ui satisfying ui(x)= ui+1(Tx) -ui+1(x) are constant. The method of the proof consists in to find a suitable Hilbert basis for L2(hm), where hm is the unique absolutely continuous invariant probability of T. In terms of this basis, the action of the Perron-Frobenious and the Koopan operator on L2(hm) can be easily understood. This result generalizes earlier results by Bamon, Kiwi, Rivera-Letelier and Urzua in the case T(x)= n x mod 1, n in N-0,1 and Lipchitizian observables u0.