arXiv:math/0601277 Abstract

arXiv:math/0601277 [math.CA]Abstract References Reviews Resources

Pointwise convergence of the ergodic bilinear Hilbert transform

Published 2006-01-12Version 1

Let ${\bf X}=(X, \Sigma, m, \tau)$ be a dynamical system. We prove that the bilinear series $\sideset{}{'}\sum_{n=-N}^{N}\frac{f(\tau^nx)g(\tau^{-n}x)}{n}$ converges almost everywhere for each $f,g\in L^{\infty}(X).$ We also give a proof along the same lines of Bourgain's analog result for averages.

Comments: 28 pages, no figures

Categories: math.CA, math.DS

Subjects: 42B20, 42B25, 37A05

Keywords: ergodic bilinear hilbert transform, pointwise convergence, bourgains analog result, bilinear series

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