On two conjectures about the intersection of longest paths and cycles

Abstract

A conjecture attributed to Smith states that every pair of longest cycles in a k-connected graph intersect each other in at least k vertices. In this paper, we show that every pair of longest cycles in a~k-connected graph on n vertices intersect each other in at least~\n,8k-n-16\ vertices, which confirms Smith's conjecture when k≥ (n+16)/7. An analog conjecture for paths instead of cycles was stated by Hippchen. By a simple reduction, we relate both conjectures, showing that Hippchen's conjecture is valid when either k ≤ 6 or k ≥ (n+9)/7.

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