Hamilton Cycles In Vertex-Transitive Graphs of Order 10p

Abstract

After long-term efforts, the Hamilton path (cycle) problem for connected vertex-transitive graphs of order pq (where p and q are primes) was finally resolved in 2021, see [10]. Fifteen years ago, mathematicians began addressing this problem for graphs of order 2pq. Among these studies, it was proved in 2012 (see [21]) that every connected vertex-transitive graph of order 10p (where p ≠ 7 is a prime) contains a Hamilton path, with the exception of a family of graphs that was recently confirmed in [11]. In this paper, we achieve a further result: every connected vertex-transitive graph of order 10p (where p is a prime) contains a Hamilton cycle, except for the truncation of the Petersen graph.