On the lattice of subgroups of a free group: complements and rank

Abstract

A -complement of a subgroup H ≤slant Fn is a subgroup K ≤slant Fn such that H K = Fn. If we also ask K to have trivial intersection with H, then we say that K is a -complement of H. The minimum possible rank of a -complement (resp. -complement) of H is called the -corank (resp. -corank) of H. We use Stallings automata to study these notions and the relations between them. In particular, we characterize when complements exist, compute the -corank, and provide language-theoretical descriptions of the sets of cyclic complements. Finally, we prove that the two notions of corank coincide on subgroups that admit cyclic complements of both kinds.