A Note on Gr\"unbaum's Conjecture about Longest Cycles and Paths

Abstract

Let c(G) denote the circumference of a graph G, i.e., the number of vertices in its longest cycle. For positive integers n and k with n>k, let (n;k) be the class of graphs of order n with c(G) = n-k such that every induced subgraph of order n-k is Hamiltonian. When k=, the class (n; 1) coincides with the family of hypohamiltonian graphs-non-Hamiltonian graphs in which the deletion of any single vertex yields a Hamiltonian graph.Replacing Hamiltonian with traceable and c(G) with p(G), the order of a longest path, defines the analogous class (n;k).Gr\"unbaum (1974) conjectured that both (n; k) and (n; k) are empty for all n>k 2. In this note, we first establish upper bounds on the maximum degree of graphs in the classes (n; k) and (n; k). Using these bounds, we show that (n; k) is empty when n<k2+2k+3, and that (n; k) is empty when n<k2+2k+2. These results provide further evidence supporting Gr\"unbaum's conjecture.