Kr-Factors in Graphs with Low Independence Number

Abstract

A classical result by Hajnal and Szemer\'edi from 1970 determines the minimal degree conditions necessary to guarantee for a graph to contain a Kr-factor. Namely, any graph on n vertices, with minimum degree δ(G) (1-1r) n and r dividing n has a Kr-factor. This result is tight but the extremal examples are unique in that they all have a large independent set which is the bottleneck. Nenadov and Pehova showed that by requiring a sub-linear independence number the minimum degree condition in the Hajnal-Szemer\'edi theorem can be improved. We show that, with the same minimum degree and sub-linear independence number, we can find a clique-factor with double the clique size. More formally, we show for every r∈ N and constant μ>0 there is a positive constant γ such that every graph G on n vertices with δ(G) (1-2r+μ)n and α(G) < γ n has a Kr-factor. We also give examples showing the minimum degree condition is asymptotically best possible.