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    • Characterizations and Directed Path-Width of Sequence Digraphs
    Authors: Frank, Gurski; Carolin, Rehs; Jochen, Rethmann;  Advisor: -;  Co-Author: - (2023)

    Computing the directed path-width of a directed graph is an NP-hard problem. Even for digraphs of maximum semi-degree 3 the problem remains hard. We propose a decomposition of an input digraph G = (V,A) by a number k of sequences with entries from V, such that (u,v) ∈ A if and only if in one of the sequences there is an occurrence of u appearing before an occurrence of v. We present several graph theoretical properties of these digraphs. Among these we give forbidden subdigraphs of digraphs which can be defined by k = 1 sequence, which is a subclass of semicomplete digraphs.