Smaller subgraphs of minimum degree k
Abstract
In 1990 Erdos, Faudree, Rousseau and Schelp proved that for k≥ 2, every graph with n≥ k+1 vertices and (k-1)(n-k+2)+k-22+1 edges contains a subgraph of minimum degree k on at most n-n/6k3 vertices. They conjectured that it is possible to remove at least εk n many vertices and remain with a subgraph of minimum degree k, for some εk>0. We make progress towards their conjecture by showing that one can remove at least (n/ n) many vertices.
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