Simple proof of Bourgain bilinear ergodic theorem and its extension to polynomials and polynomials in primes

Abstract

We first present a modern simple proof of the classical ergodic Birkhoff's theorem and Bourgain's homogeneous bilinear ergodic theorem. This proof used the simple fact that the shift map on integers has a simple Lebesgue spectrum. As a consequence, we establish that the homogeneous bilinear ergodic averages along polynomials and polynomials in primes converge almost everywhere, that is, for any invertible measure preserving transformation T, acting on a probability space (X, B, μ), for any f ∈ Lr(X,μ) , g ∈ Lr'(X,μ) such that 1r+1r'= 1, for any non-constant polynomials P(n),Q(n), n ∈ Z, taking integer values, and for almost all x ∈ X, we have, 1NΣn=1Nf(TP(n)x) g(TQ(n)x), and 1πNΣp ≤ Np~~primef(TP(p)x) g(TQ(p)x), converge. Here πN is the number of prime in [1,N].