Revisiting the Hamiltonian Theme in the Square of a Block: The General Case
Abstract
This is the second part of joint research in which we show that every 2-connected graph G has the F4 property. That is, given distinct xi∈ V(G), 1≤ i≤ 4, there is an x1x2-hamiltonian path in G2 containing different edges x3y3, x4y4∈ E(G) for some y3,y4∈ V(G). However, it was shown already in [Theorem 2]cf1:refer that 2-connected DT-graphs have the F4 property; based on this result we generalize it to arbitrary 2-connected graphs. We also show that these results are best possible.
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