Tight Upper Bounds on Color Reversal by Local Inversions

Abstract

A bicoloration of a graph G=(V,E) is a map β:V\-1,1\. A local inversion at a vertex v complements the subgraph induced by the neighbors of v and simultaneously reverses the colors of all neighbors of v. Sabidussi (Discrete Mathematics, 1987) showed that every bicolored graph on n vertices without isolated vertices admits a color reversal using at most 6n+3 local inversions, and that any two bicolorings of such a graph can be transformed into each other using at most 9n local inversions. Recently, Porte, Sandeep, and Santra (CALDAM 2026) improved these bounds to 4n-3 and (11n-3)/2, respectively. We prove the tight bound 3n by showing that, for every graph on n vertices without isolated vertices, any bicoloring can be transformed into any other bicoloring using at most 3n local inversions. We also show that this bound is best possible: for complete graphs and stars on n vertices, at least 3n local inversions are required to reverse the colors of all vertices. Moreover, the proof of the upper bound is constructive: given two bicolorings, it produces, in polynomial time, a sequence of at most 3n local inversions transforming one into the other.