A P\'osa-type condition of potentially 3C-graphic sequences

Abstract

A non-increasing sequence π=(d1,…,dn) of nonnegative integers is said to be graphic if it is realizable by a simple graph G on n vertices. A graphic sequence π=(d1,…,dn) is said to be potentially 3C-graphic if there is a realization of π containing cycles of every length r, 3 r . It is well-known that if the non-increasing degree sequence (d1,…,d) of a graph G on vertices satisfies the P\'osa condition that d+1-i i+1 for every i with 1 i<2, then G is either pancyclic or bipartite. In this paper, we obtain a P\'osa-type condition of potentially 3C-graphic sequences, that is, we prove that if 5 is an integer, n and π=(d1,…,dn) is a graphic sequence with d+1-i i+1 for every i with 1 i<2, then π is potentially 3C-graphic. This result improves a Dirac-type condition of potentially 3C-graphic sequences due to Yin et al. [Appl. Math. Comput., 353 (2019) 88--94], and asymptotically answers a problem due to Li et al. [Adv. Math., 33 (2004) 273--283]. As an application, this result also completely implies the value σ(C,n) for 5 and n , improving the result of Lai [J. Combin. Math. Combin. Comput., 49 (2004) 57--64].