Asymptotically sharpening the s-Hamiltonian index bound

Abstract

For a non-negative integer s |V(G)|-3, a graph G is s-Hamiltonian if the removal of any k s vertices results in a Hamiltonian graph. Given a connected simple graph G that is not isomorphic to a path, a cycle, or a K1,3, let δ(G) denote the minimum degree of G, let hs(G) denote the smallest integer i such that the iterated line graph Li(G) is s-Hamiltonian, and let (G) denote the length of the longest non-closed path P in which all internal vertices have degree 2 such that P is not both of length 2 and in a K3. For a simple graph G, we establish better upper bounds for hs(G) as follows. equation* hs(G) \ aligned & (G)+1, && if δ(G) 2 and s=0;\\ & d(G)+2+ (s+1), && if δ(G) 2 and s 1;\\ & 2+s+1δ(G)-2, && if 3δ(G) s+2;\\ & 2, && otherwise, aligned . equation* where d(G) is the smallest integer i such that δ(Li(G)) 3. Consequently, when s 6, this new upper bound for the s-hamiltonian index implies that hs(G) = o((G)+s+1) as s ∞. This sharpens the result, hs(G)(G)+s+1, obtained by Zhang et al. in [Discrete Math., 308 (2008) 4779-4785].