Model theory and metric convergence II: Averages of unitary polynomial actions

Abstract

We use model theory of metric structures to prove the pointwise convergence, with a uniform metastability rate, of averages of a polynomial sequence \Tn\ (in Leibman's sense) of unitary transformations of a Hilbert space. As a special case, this applies to unitary sequences \Up(n)\ where p is a polynomial Z and U a fixed unitary operator; however, our convergence results hold for arbitrary Leibman sequences. As a case study, we show that the non-nilpotent "lamplighter group" Z is realized as the range of a suitable quadratic Leibman sequence. We also indicate how these convergence results generalize to arbitrary Folner averages of unitary polynomial actions of any abelian group G in place of Z.