English

Smooth Livsic regularity for piecewise expanding maps

Dynamical Systems 2010-07-26 v1

Abstract

We consider the regularity of measurable solutions χ\chi to the cohomological equation ϕ=χTχ, \phi = \chi \circ T -\chi, where (T,X,μ)(T,X,\mu) is a dynamical system and ϕ ⁣:XR\phi \colon X\rightarrow \R is a CkC^k valued cocycle in the setting in which T ⁣:XXT \colon X\rightarrow X is a piecewise CkC^k Gibbs--Markov map, an affine β\beta-transformation of the unit interval or more generally a piecewise CkC^{k} uniformly expanding map of an interval. We show that under mild assumptions, bounded solutions χ\chi possess CkC^k versions. In particular we show that if (T,X,μ)(T,X,\mu) is a β\beta-transformation then χ\chi has a CkC^k version, thus improving a result of Pollicott et al.~\cite{Pollicott-Yuri}.

Keywords

Cite

@article{arxiv.1007.4190,
  title  = {Smooth Livsic regularity for piecewise expanding maps},
  author = {Matthew Nicol and Tomas Persson},
  journal= {arXiv preprint arXiv:1007.4190},
  year   = {2010}
}
R2 v1 2026-06-21T15:52:26.616Z