Joint ergodicity of piecewise monotone interval maps

Abstract

For i = 0, 1, 2, …, k, let μi be a Borel probability measure on [0,1] which is equivalent to Lebesgue measure λ and let Ti:[0,1] → [0,1] be μi-preserving ergodic transformations. We say that transformations T0, T1, …, Tk are uniformly jointly ergodic with respect to (λ; μ0, μ1, …, μk) if for any f0, f1, …, fk ∈ L∞, \[ N -M → ∞ 1N-M Σn=MN-1 f0 ( T0n x) · f1 (T1n x) ·s fk (Tkn x) = Πi=0k ∫ fi \, d μi in L2(λ). \] We establish convenient criteria for uniform joint ergodicity and obtain numerous applications, most of which deal with interval maps. Here is a description of one such application. Let TG denote the Gauss map, TG(x) = 1x \, ( \, 1), and, for β >1, let Tβ denote the β-transformation defined by Tβ x = β x \, ( \,1). Let T0 be an ergodic interval exchange transformation. Let β1 , ·s , βk be distinct real numbers with βi >1 and assume that βi π26 2 for all i = 1, 2, …, k. Then for any f0, f1, f2, …, fk+1 ∈ L∞ (λ), equation* split N -M → ∞ 1N -M Σn=MN-1 & f0 (T0n x) · f1 (Tβ1n x) ·s fk (Tβkn x) · fk+1 (TGn x) &= ∫ f0 \, d λ · Πi=1k ∫ fi \, d μβi · ∫ fk+1 \, d μG in L2(λ). split equation* We also study the phenomenon of joint mixing. Among other things we establish joint mixing for skew tent maps and for restrictions of finite Blaschke products to the unit circle.