Embedding clique-factors in graphs with low -independence number

Abstract

The following question was proposed by Nenadov and Pehova and reiterated by Knierim and Su: Given integers ,r and n with n∈ rN, is it true that every n-vertex graph G with δ(G) \ 12,r - r \n + o(n) and α(G) = o(n) contains a Kr-factor? We give a negative answer for the case when 3r4 by giving a family of constructions using the so-called cover thresholds and show that the minimum degree condition given by our construction is asymptotically best possible. That is, for all integers r, with r > 34r and μ >0, there exist α > 0 and N such that for every n∈ rN with n>N, every n-vertex graph G with δ(G) ( 12-(r-1) + μ )n and α(G) α n contains a Kr-factor. Here (r-1) is the Ramsey--Tur\'an density for Kr-1 under the -independence number condition.