Subcohomology and a Livsic Theorem for Zooming Systems

Abstract

In the context of continuous zooming systems f:M M on a compact metric space M, which include the non-uniformly expanding ones, possibly with the presence of a critical set, with the zooming set dense in M, we prove that any H\"older potential φ : M R for which the integrals ∫ φ dμ ≥ 0 with respect to any f-invariant probability μ, admits a continuous function λ0 : M R (which can be H\"older if some integral is positive) such that \[ φ ≥ λ0- λ0 f. \] This extends a result in [9] for C1-expanding maps on the circle T = R/Z to important classes of maps as uniformly expanding, local diffeomorphisms with non-uniform expansion, Viana maps, Benedicks-Carleson maps and Rovella maps. We also give an example beyond the exponential contractions context. Moreover, in the case of the integrals ∫ φ dμ = 0 with respect to any f-invariant probability μ and the set of periodic points to be dense in M, we obtain a version of the Livsic Theorem, that is, the functions λ0 can be taken such that \[ φ = λ0- λ0 f. \] Additionally, we also prove that the measure which maximizes the integrals is unique for a residual set of potentials.