Non-conventional ergodic averages for several commuting actions of an amenable group

Abstract

Let (X,μ) be a probability space, G a countable amenable group and (Fn)n a left F lner sequence in G. This paper analyzes the non-conventional ergodic averages \[1|Fn|Σg ∈ FnΠi=1d (fi T1g·s Tig)\] associated to a commuting tuple of μ-preserving actions T1, ..., Td:G X and f1, ..., fd ∈ L∞(μ). We prove that these averages always converge in \|·\|2, and that they witness a multiple recurrence phenomenon when f1 = … = fd = 1A for a non-negligible set A⊂eq X. This proves a conjecture of Bergelson, McCutcheon and Zhang. The proof relies on an adaptation from earlier works of the machinery of sated extensions.