On the extremal function for graph minors
Abstract
For a graph H, let c(H)=∈f\c\,:\,e(G)≥ c|G| implies G H\,\, where G H means that H is a minor of G. We show that if H has average degree d, then c(H) (0.319…+od(1))|H| d where 0.319… is an explicitly defined constant. This bound matches a corresponding lower bound shown to hold for almost all such H by Norin, Reed, Wood and the first author.
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