Double Recurrence and Almost Sure Convergence: Primes and Weighted Theory
Abstract
Let (X,μ) be a probability space equipped with an invertible, measure-preserving transformation T X X. We exhibit a wide class of weights w so that whenever f,g ∈ L∞(X), the bilinear ergodic averages \[ 1N Σn ≤ N w(n)\, Tanf · Tbng, a,b ∈ Z \] converge μ-almost surely. This class encompasses the von Mangoldt function, resolving Problem 12 from Frantzikinakis' survey on open problems in ergodic theory, the divisor function, the sum-of-two-squares representation function, etc., as well as their restrictions to lower-density Piatetski-Shapiro sequences of the form \ kc : k ∈ N\, 1 ≤ c < 7/6. Our methods combine combinatorial number theory and higher-order Fourier analysis with classical Fourier-analytic/martingale-based methods; the role of U3 analysis is particularly significant.
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