Pointwise convergence of polynomial multiple ergodic averages along the primes

Abstract

We establish pointwise almost everywhere convergence for the polynomial multilinear ergodic averages 1N Σn=1N (n) f1(TP1(n) x)·s fk(TPk(n) x) as N ∞, where is the von Mangoldt function, T X X is an invertible measure-preserving transformation of a probability space (X,ν), P1,…, Pk are polynomials with integer coefficients and distinct degrees, and f1,…,fk∈ L∞(X). This pointwise almost everywhere convergence result can be seen as a refinement of the norm convergence result obtained in Wooley--Ziegler (Amer. J. Math, 2012) in the case of polynomials with distinct degrees. We develop a multilinear circle method for von Mangoldt-weighted (equivalently, prime-weighted) averages in the general k-linear setting. The advantage of our method, besides establishing Weyl-type inequalities for multilinear Cramér-weighted averages and sharp p-adic Lq-improving multilinear estimates among other tools, is that for the first time it allows us to work with inverse theorems having subpolynomial bounds in the general multilinear setting. This, in turn, yields sharp r-variational estimates r > 2 for our weighted polynomial multilinear ergodic average and, more importantly, offers prospects for addressing other multilinear problems involving inverse theorems lacking polynomial bounds.