English

Wiener-Wintner for Hilbert Transform

Classical Analysis and ODEs 2007-05-23 v1 Dynamical Systems

Abstract

We prove the following extension of the Wiener--Wintner Theorem in Ergodic Theor and the Carleson Theorem on pointwise convergence of Fourier series: For all measure preserving flows (X,μ,Tt) (X,\mu , T_t) and fLp(X,μ) f\in L^p (X,\mu), there is a set XfXX_f\subset X of probability one, so that for all xXfx\in X_f we have \begin{equation*} \lim _{s\downarrow0} \int _{s<\abs t<1/s} \operatorname e ^{i \theta t} f(\operatorname T_tx)\; \frac{dt}t \qquad \text{exists for all θ\theta.} \end{equation*} The proof is by way of establishing an appropriate oscillation inequality which is itself an extension of Carleson's theorem.

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Cite

@article{arxiv.math/0601192,
  title  = {Wiener-Wintner for Hilbert Transform},
  author = {Michael Lacey and Erin Terwilleger},
  journal= {arXiv preprint arXiv:math/0601192},
  year   = {2007}
}

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