The Cost of 2-Distinguishing Hypercubes

Abstract

A graph G is said to be 2-distinguishable if there is a labeling of the vertices with two labels so that only the trivial automorphism preserves the labels. The minimum size of a label class, over all 2-distinguishing labelings, is called the cost of 2-distinguishing, denoted by (G). For n≥ 4 the hypercubes Qn are 2-distinguishable, but the values for (Qn) have been elusive, with only bounds and partial results previously known. This paper settles the question. The main result can be summarized as: for n≥ 4, (Qn) ∈ \1+ 2 n , 2 + 2 n\. Exact values are be found using a recursive relationship involving a new parameter m, the smallest integer for which (Q_m)=m. The main result isgather* 4≤ n ≤ 12 (Qn)=5, and 5≤ m ≤ 11 m=4; \\ for m≥ 6, (Qn) = m 2m-2 - m-1 + 1 ≤ n ≤ 2m-1-m; \\ for n≥ 5, m = n 2n-1 - (Qn-1) + 1≤ m ≤ 2n-(Qn).gather*