B. M. Gurevich, S. A. Komech, A. A. Tempelman, “Random averaging in ergodic theorem”, Mosc. Math. J., 2019, Volume 19, Number 1,Pages <nobr>77

Random averaging in ergodic theorem

B. M. Gurevich^a, S. A. Komech^b, A. A. Tempelman^b

^a Dept. Mech. and Math. Moscow State University, 119991 GSP-1, Moscow, Russia
^b IITP RAS, Bolshoy Karetny per. 19, build. 1, Lab. 4, Moscow 127051 Russia

Abstract: For some symbolic dynamical systems we study the value of the boundary deformation for a small ball in the phase space during a period of time depending on the center and radius of the ball. For actions of countable Abelian groups, a version of the Mean Ergodic theorem with averaging over random sets is proved and used in the proof of the main theorem on deformation rate.

Key words and phrases: symbolic dynamical systems, topological Markov shift, sofic system, synchronized system, magic word, invariant measure, metric entropy, Mean Ergodic theorem, boundary deformation rate.

MSC: 28D20, 37A05, 37A30, 37A50, 37B10.

DOI: 10.17323/1609-4514-2019-19-1-77-88