Long cycles in random subgraphs of graphs with large minimum degree
Abstract
Let G be any graph of minimum degree at least k, and let Gp be the random subgraph of G obtained by keeping each edge independently with probability p. Recently, Krivelevich, Lee and Sudakov showed that if pk∞ then with probability tending to 1 Gp contains a cycle of length at least (1-o(1))k. We give a much shorter proof of this result, also based on depth-first search.
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