Undecidability of the submonoid membership problem for a sufficiently large finite direct power of the Heisenberg group

Abstract

The submonoid membership problem for a finitely generated group G is the decision problem, where for a given finitely generated submonoid M of G and a group element g it is asked whether g ∈ M. In this paper, we prove that for a sufficiently large direct power Hn of the Heisenberg group H, there exists a finitely generated submonoid M whose membership problem is algorithmically unsolvable. Thus, an answer is given to the question of M. Lohrey and B. Steinberg about the existence of a finitely generated nilpotent group with an unsolvable submonoid membership problem. It also answers the question of T. Colcombet, J. Ouaknine, P. Semukhin and J. Worrell about the existence of such a group in the class of direct powers of the Heisenberg group. This result implies the existence of a similar submonoid in any free nilpotent group Nk,c of sufficiently large rank k of the class c≥ 2. The proofs are based on the undecidability of Hilbert's 10th problem and interpretation of Diophantine equations in nilpotent groups.