The inversion number of dijoins and blow-up digraphs
Abstract
For an oriented graph D, the inversion of X ⊂eq V(D) in D is the digraph obtained from D by reversing the direction of all arcs with both ends in X. The inversion number of D, denoted by inv(D), is the minimum number of inversions needed to transform D into an acyclic digraph. In this paper, we first show that inv (C3 ⇒ D)= inv(D) +1 for any oriented graph D with even inversion number inv(D), where the dijoin C3 ⇒ D is the oriented graph obtained from the disjoint union of C3 and D by adding all arcs from C3 to D. Thus we disprove the conjecture of Aubian el at. 2212.09188 and the conjecture of Alon el at. 2212.11969. We also study the blow-up graph which is an oriented graph obtained from a tournament by replacing all vertices into oriented graphs. We construct a tournament T with order n and inv(T)=n3+1 using blow-up graphs.
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