Improved bounds for the triangle case of Aharoni's rainbow generalization of the Caccetta-H\"aggkvist conjecture

Abstract

For a digraph G and v ∈ V(G), let δ+(v) be the number of out-neighbors of v in G. The Caccetta-H\"aggkvist conjecture states that for all k 1, if G is a digraph with n = |V(G)| such that δ+(v) k for all v ∈ V(G), then G contains a directed cycle of length at most n/k . Aharoni proposed a generalization of this conjecture, that a simple edge-colored graph on n vertices with n color classes, each of size at least k, has a rainbow cycle of length at most n/k . Let us call (α, β) triangular if every simple edge-colored graph on n vertices with at least α n color classes, each with at least β n edges, has a rainbow triangle. Aharoni, Holzman, and DeVos showed the following: (9/8,1/3) is triangular; (1,2/5) is triangular. In this paper, we improve those bounds, showing the following: (1.1077,1/3) is triangular; (1,0.3988) is triangular. Our methods give results for infinitely many pairs (α, β), including β < 1/3; we show that (1.3481,1/4) is triangular.