Subgroup and Coset Intersection in abelian-by-cyclic groups

Abstract

We consider two decision problems in infinite groups. The first problem is Subgroup Intersection: given two finitely generated subgroups G , H of a group G, decide whether the intersection G H is trivial. The second problem is Coset Intersection: given two finitely generated subgroups G , H of a group G, as well as elements g, h ∈ G, decide whether the intersection of the two cosets g G h H is empty. We show that both problems are decidable in finitely generated abelian-by-cyclic groups. In particular, we reduce them to the Shifted Monomial Membership problem (whether an ideal of the Laurent polynomial ring over integers contains any element of the form Xz - f,\; z ∈ Z \0\). We also point out some obstacles for generalizing these results from abelian-by-cyclic groups to arbitrary metabelian groups.