Edgeless graphs are the only universal fixers
Abstract
Given two disjoint copies of a graph G, denoted G1 and G2, and a permutation π of V(G), the graph π G is constructed by joining u ∈ V(G1) to π(u) ∈ V(G2) for all u ∈ V(G1). G is said to be a universal fixer if the domination number of π G is equal to the domination number of G for all π of V(G). In 1999 it was conjectured that the only universal fixers are the edgeless graphs. Since then, a few partial results have been shown. In this paper, we prove the conjecture completely.
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