Edge-Number Bounds for the Inversion Diameter of Graphs

Abstract

The inversion of a set X of vertices in an oriented graph reverses every arc with both endpoints in X. The inversion graph I(G) of a graph G has the labelled orientations of G as its vertices, two orientations being adjacent when a single inversion transforms one into the other, and the inversion diameter (I(G)) is its diameter. Answering a question of Havet, Hörsch and Rambaud, we prove the bound in terms of edge number (I(G)) 2|E(G)|, and we complement it with a lower bound (I(G)) |E(G)||V(G)| obtained by viewing I(G) as a Cayley graph on 2E(G). We further refine the upper bound for bipartite graphs G by showing (I(G)) \ρ, 2(2+σ(2ρ-1-1))\ where the two parts of G have maximum degrees σ and ρ, respectively.