An Ore-type condition for H-tilings in graphs
Abstract
A graph G admits an H-tiling if it contains a collection of vertex-disjoint copies of H. In this paper, we confirm a conjecture proposed by Kühn, Osthus, and Treglown by showing that for any given graph H, there exists a constant C(H) such that the following holds. If G is a sufficiently large n-vertex graph satisfying d(x) + d(y) ≥ 2(1 - 1/χcr(H))n for all nonadjacent vertices x, y ∈ V(G), then G contains an H-tiling covering all but at most C(H) vertices. Here χcr(H) denotes the critical chromatic number of H.
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