József Balogh, Alexandr V. Kostochka, Andrew Treglown
Published 2011-10-16, updated 2013-03-08Version 2
We say that a graph G has a perfect H-packing if there exists a set of vertex-disjoint copies of H which cover all the vertices in G. We consider various problems concerning perfect H-packings: Given positive integers n, r, D, we characterise the edge density threshold that ensures a perfect K_r-packing in any graph G on n vertices and with minimum degree at least D. We also give two conjectures concerning degree sequence conditions which force a graph to contain a perfect H-packing. Other related embedding problems are also considered. Indeed, we give a structural result concerning K_r-free graphs that satisfy a certain degree sequence condition.
Comments: 18 pages, 1 figure. Electronic Journal of Combinatorics 20(1) (2013) #P57. This version contains an open problem section
An Ore-type theorem for perfect packings in graphs
Asymptotically optimal $K_k$-packings of dense graphs via fractional $K_k$-decompositions
Small Minors in Dense Graphs
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