Exact supported co-degree bounds for Hamilton cycles
Abstract
For any k 3 and ∈ [k-1] such that (k,) (3,1), we show that any sufficiently large k-graph G must contain a Hamilton -cycle provided that it has no isolated vertices and every set of k-1 vertices contained in an edge is contained in at least (1 - 1kk-(k-))n - (k - 3) edges. We also show that this bound is tight for infinitely many values of k and and is off by at most 1 for all others, and is hence essentially optimal. This improves an asymptotic version of this result due to Mycroft and Z\'arate-Guer\'en, and the case = k-1 completely resolves a conjecture of Illingworth, Lang, M\"uyesser, Parczyk and Sgueglia. These results support the utility of minimum supported co-degree conditions in a k-graph, a recently introduced variant of the standard notion of minimum co-degree applicable to k-graphs with non-trivial strong independent sets. Our proof techniques involve a novel blow-up tiling framework introduced by Lang, avoiding traditional approaches using the regularity and blow-up lemmas.
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