Jackson's inequality on the hypercube
Abstract
We investigate the best constant such that Jackson's inequality holds for all functions on the hypercube , where denotes the sensitivity of . We show that the quantity is bounded below by an absolute positive constant, independent of . This complements Wagner's theorem, which establishes that . As a first application we show that reverse Bernstein inequality fails in the tail space improving over previously known counterexamples in . As a second application, we show that there exists a function whose sensitivity remains constant, independent of , while the approximate degree grows linearly with . This result implies that the sensitivity theorem fails in the strongest sense for bounded real-valued functions even when is relaxed to the approximate degree. We also show that in the regime , the bound holds. Moreover, when restricted to symmetric real-valued functions, we obtain and the decay is sharp. Finally, we present results for a subspace approximation problem: we show that there exists a subspace of dimension such that holds for all .
Cite
@article{arxiv.2410.19949,
title = {Jackson's inequality on the hypercube},
author = {Paata Ivanisvili and Roman Vershynin and Xinyuan Xie},
journal= {arXiv preprint arXiv:2410.19949},
year = {2024}
}