Heavy and Light Paths and Hamilton Cycles

Abstract: Given a graph G, we denote by f (G, u 0 , k) the number of paths of length k in G starting from u 0 . In graphs of maximum degree 3, with edge weights i.i.d. with exp(1), we provide a simple proof showing that (under the assumption that f (G, u 0 , k) = ω(1)) the expected weight of the heaviest path of length k in G starting from u 0 is at leastand the expected weight of the lightest path of length k in G starting from u 0 is at mostWe demonstrate the immediate implication of this result for Hamilton paths and… Show more