Trees with distinguishing index equal distinguishing number plus one
Abstract
The distinguishing number (index) D(G) (D'(G)) of a graph G is the least integer d such that G has an vertex (edge) labeling with d labels that is preserved only by the trivial automorphism. It is known that for every graph G we have D'(G) ≤ D(G) + 1. In this note we characterize trees for which this inequality is sharp. We also show that if G is a connected unicyclic graph, then D'(G) = D(G).
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