On the convergence of multiple ergodic means

Abstract

Given sequence of measure preserving transformations \Uk:\,k=1,2,…, n\ on a measurable space (X,μ). We prove a.e. convergence of the ergodic means equation 1s1·s snΣj1=0s1-1·sΣjn=0sn-1f(U1j1·s Unjn x ) equation as j sj∞ , for any function f∈ Ld-1(X), where d n is the rank of the transformations. The result gives a generalization of a theorem by N. Dunford and A. Zygmund, claiming the convergence of the means in a narrower class of functions Ln-1(X).

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