Factors in finite groups and well-covered graphs

Abstract

We study a combinatorial property of subsets in finite groups that is analogous to the notion of independence in graphs. Given a group G and a non-empty subset A⊂ G, we define a (right) s-factor as a subset B⊂ G satisfying the following conditions: (i) Every element of AB can be written uniquely as ab with a∈ A and b∈ B. (ii) B is maximal (with respect to inclusion) with this property. For a finite group G, the upper and lower indices of A are the sizes of the largest and smallest s-factors associated with A. A subset is called stable if its upper and lower indices coincide. A group is called stable if all its subsets are stable. We then explore the connection between s-factors in groups and maximal independent sets in graphs. Specifically, we show that s-factors in G associated with A correspond to maximal independent sets in a Cayley graph Cay(G, S), where S=A-1A\e\. Consequently, the upper and lower indices of A are equal to the independence number and the independent domination number of the associated Cayley graph. The concepts of s-factors, subset indices in groups, stable subsets, and stable groups (under different names) were introduced by Hooshmand in 2020. Later, Hooshmand and Yousefian-Arani classified stable groups using computer calculations. Using the connection with graphs, we compute the upper and lower indices for various groups and their subsets. Furthermore, we prove a classification theorem describing all stable groups without relying on computer calculations.