Openly disjoint cycles and directed tree-width of regular digraphs

Abstract

Given a digraph D, let c(D) denote the largest integer k such that there are k openly disjoint cycles through a vertex, i.e., a collection of directed cycles C1,…,Ck through a common vertex v such that C1-v,…,Ck-v are pairwise vertex-disjoint. The famous Caccetta-H\"aggkvist conjecture and its regular variant due to Behzad, Chartrand and Wall from 1970, have motivated the study of degree conditions forcing c(D) to be large. In 1985 Thomassen constructed digraphs of arbitrarily high minimum out- and in-degree such that c(D) 2. In 2005, Seymour asked whether in contrast every r-regular digraph satisfies c(D)=r, which would have implied the Behzad-Chartrand-Wall conjecture. In 2008, Mader answered this negatively for every r 8, but conjectured that nevertheless the minimum value cr of c(D) over all r-regular digraphs grows with r, i.e. r→∞cr=∞. As the first main result of our paper, we prove Mader's conjecture in a strong form by showing cr 322 r for every r∈ N. We also show cr 7 r8, improving the previous best upper bound cr r-(r) due to Mader. In our second main result we show that every r-regular digraph has directed tree-width (r). This is tight up to the implied constant and cannot be extended to digraphs of minimum out- and in-degree at least r. As a corollary we obtain the existence of a function f:N→ N such that every regular digraph with degree at least f(k) contains a subdivision of the cylindrical wall of order k, and hence of a large class of planar digraphs. This makes progress on the notoriously difficult problem of finding degree conditions guaranteeing subdivisions of digraphs, related to a well-known conjecture of Mader from 1985.