Edge-statistics beyond 1/e
Abstract
For integers k and , let ind(k, ) be the maximum proportion of k-vertex subsets of a large graph that induce exactly edges. The edge-statistics theorem (conjectured by Alon-Hefetz-Krivelevich-Tyomkyn, and proved by Kwan-Sudakov-Tran, Fox-Sauermann, and Martinsson-Mousset-Noever-Truji\'c) asserts that, for k ∞ and 0 < <k2, one has ind(k, ) 1/e + o(1). We investigate the ''stability'' of this problem: how can one improve this bound under additional assumptions on ? In particular, the edge-statistics theorem is tight when ∈ \1,k-1,k2-(k-1),k2-1\; we show that for all other , one can replace 1/e with a strictly smaller constant. This extends an analogous result of Ueltzen in the setting of graph inducibility. We also obtain a much stronger (and essentially optimal) upper bound on ind(k, ) when is far from a multiple of k, refining and extending previous bounds due to Fox and Sauermann.
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