The distinguishing number of groups based on the distinguishing number of subgroups

Abstract

Let be a group acting on a set X. The distinguishing number for this action of on X, denoted by D(X), is the smallest natural number k such that the elements of X can be labeled with k labels so that any label-preserving element of fixes all x ∈ X. In particular, if the action is faithful, then the only element of preserving labels is the identity. In this paper, we obtain an upper bound on the distinguishing number of a set knowing the distinguishing number of a set under the action of a subgroup. By the concept of motion, we obtain an upper bound for the distinguishing number of a group. Motivated by a problem (Chan 2006), we characterize D,H(X) which is the smallest number of labels admitting a labeling of X such that the only elements of that induce label-preserving permutations lie in H. Finally, we state two algorithms for obtaining an upper and a lower bound for D , H(X).