On entropy of -irregular and -level sets in maps with the shadowing property

Abstract

We study the properties of -irregular sets (sets of points for which the Birkhoff average diverges) in dynamical systems with the shadowing property. We estimate the topological entropy of -irregular set in terms of entropy on chain recurrent classes and prove that -irregular sets of full entropy are typical. We also consider -level sets (sets of points whose Birkhoff average is in a specified interval), relating entropy they carry with the entropy of some ergodic measures. Finally, we study the problem of large deviations considering the level sets with respect to reference measures.