A Degree Sequence Version of the Kühn–Osthus Tiling Theorem

Abstract

A fundamental result of Kühn and Osthus [The minimum degree threshold for perfect graph packings, Combinatorica, 2009] determines up to an additive constant the minimum degree threshold that forces a graph to contain a perfect $H$-tiling. We prove a degree sequence version of this result which allows for a significant number of vertices to have lower degree.