Cyclability of id-cycles in graphs

Abstract

Let G be a graph on n vertices and C'=v0v1·s vp-1v0 a vertex sequence of G with p≥ 3 (vi≠ vj for all i,j=0,1,…,p-1, i≠ j). If for any successive vertices vi, vi+1 on C', either vivi+1∈ E(G) or both of the first implicit-degrees of vi and vi+1 are at least n/2 (indices are taken modulo p), then C' is called an id-cycle of G. In this paper, we prove that for every id-cycle C', there exists a cycle C in G with V(C')⊂eq V(C). This generalizes several early results on the Hamiltonicity and cyclability of graphs.