A Hard-Analytic Proof of "Most" Polynomial Wiener-Wintner Theorems for Infinite Measure Spaces

Abstract

We provide a new proof of ``most" cases of the polynomial Wiener-Wintner theorem for σ-finite spaces, using hard-analytic methods. Specifically, we prove that whenever (X,μ,T) is a σ-finite measure-preserving system, and f ∈ Lp(X), \ 1 ≤ p < ∞, there exists a co-null set Xf ⊂ X so that for all ω ∈ Xf \[ 1N Σn ≤ N e2 π i P(n) f(Tn ω) \] converges for all polynomials P which are either linear, or vanish to degree 2 at the origin.

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