An Efficient Regularity Lemma for Semi-Algebraic Hypergraphs
Abstract
We use the polynomial method of Guth and Katz to establish stronger and {\it more efficient} regularity and density theorems for such -uniform hypergraphs , where is a finite point set in , and the edge set is determined by a semi-algebraic relation of bounded description complexity. In particular, for any we show that one can construct in time, an equitable partition into subsets, for any , so that all but -fraction of the -tuples are {\it homogeneous}: we have that either or . If the points of can be perturbed in a general position, the bound improves to , and the partition is attained via a {\it single partitioning polynomial} (albeit, at expense of a possible increase in worst-case running time). In contrast to the previous such regularity lemmas which were established by Fox, Gromov, Lafforgue, Naor, and Pach and, subsequently, Fox, Pach and Suk, our partition of does not depend on the edge set provided its semi-algebraic description complexity does not exceed a certain constant. As a by-product, we show that in any -partite -uniform hypergraph of bounded semi-algebraic description complexity in and with edges, one can find, in expected time , subsets of cardinality , so that .
Cite
@article{arxiv.2407.15518,
title = {An Efficient Regularity Lemma for Semi-Algebraic Hypergraphs},
author = {Natan Rubin},
journal= {arXiv preprint arXiv:2407.15518},
year = {2024}
}
Comments
Submitted to a conference. Improved presentation and updated Discussion in Section 6