On the Distinguishing Number of Cyclic Tournaments: Towards the Albertson-Collins Conjecture

Abstract

A distinguishing r-labeling of a digraph G is a mapping λ from the set of verticesof G to the set of labels \1,…,r\ such that no nontrivial automorphism of G preserves all the labels.The distinguishing number D(G) of G is then the smallest r for which G admits a distinguishing r-labeling.From a result of Gluck (David Gluck, Trivial set-stabilizers in finite permutation groups, Can. J. Math. 35(1) (1983), 59--67),it follows that D(T)=2 for every cyclic tournament~T of (odd) order 2q+1 3.Let V(T)=\0,…,2q\ for every such tournament.Albertson and Collins conjectured in 1999that the canonical 2-labeling λ* given byλ*(i)=1 if and only if i q is distinguishing.We prove that whenever one of the subtournaments of T induced by vertices \0,…,q\or \q+1,…,2q\ is rigid, T satisfies Albertson-Collins Conjecture.Using this property, we prove that several classes of cyclic tournaments satisfy Albertson-Collins Conjecture.Moreover, we also prove that every Paley tournament satisfies Albertson-Collins Conjecture.