Abstract.
Using doubly lexical orders and the notion of box partition due to de Figueiredo, Maffray, and Porto, we show that a certain subclass of bull-free weakly chordal graphs is perfectly orderable. This together with results of de Figueiredo, Maffray, and Porto confirms Chvátal's conjecture that bull-free graphs with no anti-hole and no odd hole are perfectly orderable; here hole means induced cycle with five or more vertices.
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Received: September 21, 1998¶Final version received: January 23, 2001
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Hayward, R. Bull-Free Weakly Chordal Perfectly Orderable Graphs. Graphs Comb 17, 479–500 (2001). https://doi.org/10.1007/PL00013413
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DOI: https://doi.org/10.1007/PL00013413