A note on inverting the dijoin of oriented graphs

Abstract

For an oriented graph D and a set X⊂eq V(D), the inversion of X in D is the graph obtained from D by reversing the orientation of each edge that has both endpoints in X. Define the inversion number of D, denoted inv(D), to be the minimum number of inversions required to obtain an acyclic oriented graph from D. The dijoin, denoted D1→ D2, of two oriented graphs D1 and D2 is constructed by taking vertex-disjoint copies of D1 and D2 and adding all edges from D1 to D2. We show that inv(D1 → D2) > inv(D1), for any oriented graphs D1 and D2 such that inv(D1) = inv(D2) 1. This resolves a question of Aubian, Havet, H\"orsch, Klingelhoefer, Nisse, Rambaud and Vermande. Our proof proceeds via a natural connection between the graph inversion number and the subgraph complementation number.

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