Independence and strong independence complexes of finite groups

Abstract

Let G be a finite group. In 2024, Cameron introduced two different concepts of independence (namely independence and strong independence) for the subsets of G, yielding to the definition of two simplicial complexes whose vertices are the elements of G. The strong independence complex Σ(G) turns out to be a subcomplex of the independence complex Σ(G). We discuss several invariant properties related to these complexes and ask a number of questions inspired by our results and the examples we construct. We study then the particular case of complexes on finite abelian groups, giving a characterization of the finite groups realizing them. In conclusion, answering a question of Cameron, we classify all finite groups in which the two concepts of independence coincide.