Clique-factors in graphs with low K-independence number
Abstract
Given r∈ N with r≥ 4, we show that there exists n0∈ N such that for every n≥ n0, every n-vertex graph G with δ(G)≥ (12+o(1))n and αr-2(G)=o(n) contains a Kr-factor. This resolves the first open case of a question proposed by Nenadov and Pehova, and reiterated by Knierm and Su. We further introduce two lower bound constructions that, along with some known results, fully resolve a question presented by Balogh, Molla, and Sharifzadeh.
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