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Anticoncentration for subgraph statistics
Consider integers \(k,\ell\) such that \(0\le \ell \le \binom{k}2\). Given a large graph \(G\), what is the fraction of \(k\)-vertex subsets of \(G\) which span exactly \(\ell\) edges? When \(G\) is empty or complete, and \(\ell\) is zero or \(\binom{k}{2}\), this fraction can be exactly 1. On the o...
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| Published in: | arXiv.org 2018-10 |
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| Main Authors: | , , |
| Format: | Article |
| Language: | English |
| Subjects: | |
| Online Access: | Get full text |
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| Summary: | Consider integers \(k,\ell\) such that \(0\le \ell \le \binom{k}2\). Given a large graph \(G\), what is the fraction of \(k\)-vertex subsets of \(G\) which span exactly \(\ell\) edges? When \(G\) is empty or complete, and \(\ell\) is zero or \(\binom{k}{2}\), this fraction can be exactly 1. On the other hand, if \(\ell\) is far from these extreme values, one might expect that this fraction is substantially smaller than 1. This was recently proved by Alon, Hefetz, Krivelevich and Tyomkyn who intiated the systematic study of this question and proposed several natural conjectures. Let \(\ell^{*}=\min\{\ell,\binom{k}{2}-\ell\}\). Our main result is that for any \(k\) and \(\ell\), the fraction of \(k\)-vertex subsets that span \(\ell\) edges is at most \(\log^{O\left(1\right)}\left(\ell^{*}/k\right)\sqrt{k/\ell^{*}}\), which is best-possible up to the logarithmic factor. This improves on multiple results of Alon, Hefetz, Krivelevich and Tyomkyn, and resolves one of their conjectures. In addition, we also make some first steps towards some analogous questions for hypergraphs. Our proofs involve some Ramsey-type arguments, and a number of different probabilistic tools, such as polynomial anticoncentration inequalities, hypercontractivity, and a coupling trick for random variables defined on a "slice" of the Boolean hypercube. |
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| ISSN: | 2331-8422 |
| DOI: | 10.48550/arxiv.1807.05202 |