On the number of vertex-disjoint cycles in digraphs

Abstract

Let k be a positive integer. Bermond and Thomassen conjectured in 1981 that every digraph with minimum outdegree at least 2k-1 contains k vertex-disjoint cycles. It is famous as one of the one hundred unsolved problems selected in [Bondy, Murty, Graph Theory, Springer-Verlag London, 2008]. Lichiardopol, Por and Sereni proved in [SIAM J. Discrete Math. 23 (2) (2009) 979-992] that the above conjecture holds for k=3. Let g be the girth, i.e., the length of the shortest cycle, of a given digraph. Bang-Jensen, Bessy and Thomass\'e conjectured in [J. Graph Theory 75 (3) (2014) 284-302] that every digraph with girth g and minimum outdegree at least gg-1k contains k vertex-disjoint cycles. Thomass\'e conjectured around 2005 that every oriented graph (a digraph without 2-cycles) with girth g and minimum outdegree at least h contains a path of length h(g-1), where h is a positive integer. In this note, we first present a new shorter proof of the Bermond-Thomassen conjecture for the case of k=3, and then we disprove the conjecture proposed by Bang-Jensen, Bessy and Thomass\'e. Finally, we disprove the even girth case of the conjecture proposed by Thomass\'e.