Regular bipartite decompositions of pseudorandom graphs

Abstract

In 1972, Kotzig proved that for every even n, the complete graph Kn can be decomposed into 2n edge-disjoint regular bipartite spanning subgraphs, which is best possible. In this paper, we study regular bipartite decompositions of (n,d,λ)-graphs, where n is an even integer and d0≤ d≤ n-1 for some absolute constant d0. With a randomized algorithm, we prove that such an (n,d,λ)-graph with λ≤ d/12 can be decomposed into at most 2 d + 36 regular bipartite spanning subgraphs. This is best possible up to the additive constant term. As a consequence, we also improve the best known bounds on λ = λ(d) by Ferber and Jain (2020) to guarantee that an (n,d,λ)-graph on an even number of vertices admits a 1-factorization, showing that λ ≤ cd is sufficient for some absolute constant c > 0.

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