A.E. Convergence vs Boundedness

Abstract

We extend Stein's maximal theorem to the bilinear setting. Let M be a homogeneous space with a transitive action of a compact abelian group, and let 1 p,q 2 and 1/2 r 1 satisfy 1/p + 1/q = 1/r. For a family of translation-invariant bilinear operators \[ Tm : Lp(M) × Lq(M) Lr(M), m ∈ N, \] that converge almost everywhere, we prove that the associated maximal operator \[ T*(f,g) = m |Tm(f,g)| \] is of weak type Lp(M) × Lq(M) Lr,∞(M). The proof relies on probabilistic methods and a bilinear extension of Stein's lemma for double Rademacher series. We also establish a bilinear analogue of Sawyer's extension of Stein's theorem for positive bilinear operators commuting with a mixing family of measure-preserving transformations. Applications include strong-type boundedness of maximal bilinear tail operators associated with ergodic transformations in the natural exponent range r = (1/p + 1/q)-1 for p,q > 1, as well as almost everywhere convergence results for bilinear Bochner--Riesz means and other bilinear ergodic averages on the torus.