Asymmetric results about graph homomorphisms

Abstract

Many important results in extremal graph theory can be roughly summarised as "if a triangle-free graph G has certain properties, then it has a homomorphism to a triangle-free graph of bounded size". For example, bounds on homomorphism thresholds give such a statement if G has sufficiently high minimum degree, and the approximate homomorphism theorem gives such a statement for all G, if one weakens the notion of homomorphism appropriately. In this paper, we study asymmetric versions of these results, where the assumptions on G and need not match. For example, we prove that if G is a graph with odd girth at least 9 and minimum degree at least δ |G|, then G is homomorphic to a triangle-free graph whose size depends only on δ. Moreover, the odd girth assumption can be weakened to odd girth at least 7 if G has bounded VC dimension or bounded domination number. This gives a new and improved proof of a result of Huang et al. We also prove that in the asymmetric approximate homomorphism theorem, the bounds exhibit a rather surprising ``double phase transition'': the bounds are super-exponential if G is only assumed to be triangle-free, they become exponential if G is assumed to have odd girth 7 or 9, and become linear if G has odd girth at least 11. Our proofs use a wide variety of techniques, including entropy arguments, the Frieze--Kannan weak regularity lemma, properties of the generalised Mycielskian construction, and recent work on abundance and the asymmetric removal lemma.

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