Hamiltonian paths in iterated line graphs
Abstract
For integer n, the n-iterated line graph Ln(G) of an undirected graph G is defined to be L(Ln-1(G)), where L1(G) is the line graph L(G) of G. In this paper we introduce hamiltonian path index. Hamiltonian path index, denoted by hp(G), is the minimum number n such that Ln(G) contains a hamiltonian path. We show that hamiltonian path index of G exists for any graph G and we set the exact value of hamiltonian path index for trees and discuss the problem about graphs with hamiltonian 2-connected blocks.
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