Hamiltonian cycles in tough (P4 P1)-free graphs
Abstract
In 1973, Chv\'atal conjectured that there exists a constant t0 such that every t0-tough graph on at least three vertices is Hamiltonian. This conjecture has inspired extensive research and has been verified for several special classes of graphs. Notably, Jung in 1978 proved that every 1-tough P4-free graph on at least three vertices is Hamiltonian. However, the problem remains challenging even when restricted to graphs with no induced P4 P1, the disjoint union of a path on four vertices and a one-vertex path. In 2013, Nikoghosyan conjectured that every 1-tough (P4 P1)-free graph on at least three vertices is Hamiltonian. Later in 2015, Broersma remarked that ``this question seems to be very hard to answer, even if we impose a higher toughness." He instead posed the following question: ``Is the general conjecture of Chv\'atal's true for (P4 P1)-free graphs?" We provide a positive answer to Broersma's question by establishing that every 23-tough (P4 P1)-free graph on at least three vertices is Hamiltonian.
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