The sparse regularity method with Schatten norms and entropy
Abstract
We introduce a regularity method for sparse graphs, with new regularity and counting lemmas which use the Schatten-von-Neumann norms to measure uniformity. This leads to -cycle removal lemmas in subgraphs of mildly-pseudorandom graphs, and also in graphs lacking a quasi-smooth family of bipartite subgraphs, extending results of Conlon, Fox, Sudakov and Zhao. We give some applications in additive combinatorics: one about translation-invariant linear equations in subsets of mildly-pseudorandom sets, one about such equations in generalized Sidon sets, and one about polygonal patterns in subsets of with few parallelograms (giving a two-dimensional analogue for a result of Prendiville). Separately, our regularity lemma implies a dense graph removal lemma with mild constant dependencies, in graphs whose spectral norms are small.
Cite
@article{arxiv.2305.08567,
title = {The sparse regularity method with Schatten norms and entropy},
author = {Alexandru Pascadi},
journal= {arXiv preprint arXiv:2305.08567},
year = {2023}
}
Comments
49 pages; comments welcome!