English

Lower bounds for the truncated Hilbert transform

Classical Analysis and ODEs 2015-05-01 v4 Functional Analysis

Abstract

Given two intervals I,JRI, J \subset \mathbb{R}, we ask whether it is possible to reconstruct a real-valued function fL2(I)f \in L^2(I) from knowing its Hilbert transform HfHf on JJ. When neither interval is fully contained in the other, this problem has a unique answer (the nullspace is trivial) but is severely ill-posed. We isolate the difficulty and show that by restricting ff to functions with controlled total variation, reconstruction becomes stable. In particular, for functions fH1(I)f \in H^1(I), we show that HfL2(J)c1exp(c2fxL2(I)fL2(I))fL2(I), \|Hf\|_{L^2(J)} \geq c_1 \exp{\left(-c_2 \frac{\|f_x\|_{L^2(I)}}{\|f\|_{L^2(I)}}\right)} \| f \|_{L^2(I)} , for some constants c1,c2>0c_1, c_2 > 0 depending only on I,JI, J. This inequality is sharp, but we conjecture that fxL2(I)\|f_x\|_{L^2(I)} can be replaced by fxL1(I)\|f_x\|_{L^1(I)}.

Keywords

Cite

@article{arxiv.1311.6845,
  title  = {Lower bounds for the truncated Hilbert transform},
  author = {Rima Alaifari and Lillian B. Pierce and Stefan Steinerberger},
  journal= {arXiv preprint arXiv:1311.6845},
  year   = {2015}
}

Comments

29 pages, 4 figures

R2 v1 2026-06-22T02:15:35.755Z