Unavoidable butterfly minors in digraphs of large cycle rank
Abstract
Cycle rank is one of the depth parameters for digraphs introduced by Eggan in 1963. We show that there exists a function f:N N such that every digraph of cycle rank at least f(k) contains a directed cycle chain, a directed ladder, or a directed tree chain of order k as a butterfly minor. We also investigate a new connection between cycle rank and a directed analogue of the weak coloring number of graphs.
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