The LexCycle on P2 P3-free Cocomparability Graphs

Abstract

A graph G is a cocomparability graph if there exists an acyclic transitive orientation of the edges of its complement graph G. LBFS+ is a variant of the generic Lexicographic Breadth First Search (LBFS), which uses a specific tie-breaking mechanism. Starting with some ordering σ0 of G, let \σi\i≥ 1 be the sequence of orderings such that σi=LBFS+(G, σi-1). The LexCycle(G) is defined as the maximum length of a cycle of vertex orderings of G obtained via such a sequence of LBFS+ sweeps. Dusart and Habib conjectured in 2017 that LexCycle(G)=2 if G is a cocomparability graph and proved it holds for interval graphs. In this paper, we show that LexCycle(G)=2 if G is a P2 P3-free cocomparability graph, where a P2 P3 is the graph whose complement is the disjoint union of P2 and P3. As corollaries, it's applicable for diamond-free cocomparability graphs, cocomparability graphs with girth at least 4, as well as interval graphs.