Revisiting the Hamiltonian Theme in the Square of a Block: The Case of DT-Graphs

Abstract

The square of a graph G, denoted G2, is the graph obtained from G by joining by an edge any two nonadjacent vertices which have a common neighbor. A graph G is said to have the Fk property if for any set of k distinct vertices x1, x2, ..., xk in G, there is a hamiltonian path from x1 to x2 in G2 containing k-2 distinct edges of G of the form xizi, i = 3, ..., k. It was proved many years ago that every 2-connected graph has the F3 property. In the first part of this work, we extend this result by proving that every 2-connected DT-graph has the F4 property (Theorem 2) and will show in the second part that this generalization holds for arbitrary 2-connected graphs, and that there exist 2-connected graphs which do not have the Fk property for any natural number k >= 5. Altogether, this answers a problem raised before in the affirmative.