Pointwise characteristic factors for Wiener Wintner double recurrence theorem

Abstract

In this paper, we extend Bourgain's double recurrence result to the Wiener-Wintner averages. Let (X, F, μ, T) be a standard ergodic system. We will show that for any f1, f2 ∈ L∞(X), the double recurrence Wiener-Wintner average \[ 1N Σn=1N f1(Tanx)f2(Tbnx) e2π i n t \] converges off a single null set of X independent of t as N ∞. Furthermore, we will show a uniform Wiener-Wintner double recurrence result: If either f1 or f2 belongs to the orthogonal complement of the Conze-Lesigne factor, then there exists a set of full measure such that the supremum on t of the absolute value of the averages above converges to 0.