An FPT algorithm for cycle rank on semi-complete digraphs

Abstract

Cycle rank is a depth parameter for digraphs introduced by Eggan in 1963. Gruber (DMTCS 2012) and Giannopoulou, Hunter, and Thilikos (DAM 2012) asked whether the problem of determining if a given digraph has cycle rank at most w is fixed-parameter tractable parameterized by w. We provide such algorithms for semi-complete digraphs, and for digraphs of bounded directed clique-width. Specifically, we show that given an n-vertex semi-complete digraph G and an integer w, one can in time O(9(w+1)4w+2 · n2) determine whether G has cycle rank at most w. The proof is reduced to the case of bounded directed clique-width, and we then show that given an n-vertex digraph G with a directed clique-width k-expression and an integer w, one can in time O(9(w+1) 4k · n) determine whether G has cycle rank at most w. Additionally, we consider the Minimum Feedback Arc Set problem on semi-complete digraphs, and show that it can be solved in time nO(w), where w is the cycle rank of the given semi-complete digraph.