We prove a function-field analogue of Bourgain's L2 pointwise ergodic theorem. Let q be a power of a prime p, let Fq[t] be the ring of polynomials over the finite field Fq, and let Fq[t][u] be the ring of polynomials over Fq[t]. Let T(1),…,T(ℓ) be commuting, measure-preserving Fq[t]-actions on a σ-finite measure space (X,μ), and let P1,…,Pℓ∈Fq[t][u]∖{0}. Define a sequence of operators (An)n∈N by Ang(x):=qn1f∈Fq[t]degf<n∑g(TP1(f)(1)⋯TPℓ(f)(ℓ)x)(g∈L2(X),x∈X). We prove that (An)n∈N satisfies an L2 oscillation ergodic theorem: n1<⋯<nt0t0∈Nsup(∫Xj=1∑t0−1nj≤n<nj+1sup∣Ang(x)−Anj+1g(x)∣2dμ(x))1/2≤C1∥g∥L2(X)(g∈L2(X)), where the constant C1>0 depends only on P1,…,Pℓ and q. This in particular implies that the sequence (Ang(x))n∈N converges for almost every x∈X and that (An)n∈N satisfies an L2 maximal inequality: n∈Nsup∣Ang∣L2(X)≤C2∥g∥L2(X)(g∈L2(X)), where the constant C2>0 depends only on P1,…,Pℓ and q. Our tools include the circle method in function fields and refinements of Weyl sum estimates in this setting, further developing the work of L\^e-Liu-Wooley and Champagne-Ge-L\^e-Liu-Wooley. These refinements are of independent interest.
@article{arxiv.2605.28997,
title = {Bourgain's $L^2$ pointwise ergodic theorem over function fields},
author = {Thái Hoàng Lê and Andrew Lott},
journal= {arXiv preprint arXiv:2605.28997},
year = {2026}
}