Quantitative norm convergence of double ergodic averages associated with two commuting group actions
Abstract
We study double averages along orbits for measure preserving actions of Aω, the direct sum of countably many copies of a finite abelian group A. In this article we show an Lp norm-variation estimate for these averages, which in particular reproves their convergence in Lp for any finite p and for any choice of two L∞ functions. The result is motivated by recent questions on quantifying convergence of multiple ergodic averages.
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