August 2024
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We present progress on two old conjectures about longest cycles in graphs. The first conjecture, due to Thomassen from 1978, states that apart from a finite number of exceptions, all connected vertex-transitive graphs contain a Hamiltonian cycle. The second conjecture, due to Smith from 1984, states that for in every r-connected graph any two longest cycles intersect in at least r vertices. In this paper, we prove a new lemma about the intersection of longest cycles in a graph which can be used to improve the best known bounds towards both of the aforementioned conjectures: First, we show that every connected vertex-transitive graph on vertices contains a cycle of length at least , improving on from [De Vos, arXiv:2302:04255, 2023]. Second, we show that in every r-connected graph with , any two longest cycles meet in at least vertices, improving on from [Chen, Faudree and Gould, J. Combin. Theory, Ser.~ B, 1998]. Our proof combines combinatorial arguments, computer-search and linear programming.