Submonoid Membership in n-dimensional lamplighter groups and S-unit equations

Abstract

We show that Submonoid Membership is decidable in n-dimensional lamplighter groups (Z/pZ) Zn for any prime p and integer n. More generally, we show decidability of Submonoid Membership in semidirect products of the form Y Zn, where Y is any finitely presented module over the Laurent polynomial ring Fp[X1, …, Xn]. Combined with a result of Shafrir (2024), this gives the first example of a group G and a finite index subgroup G ≤ G, such that Submonoid Membership is decidable in G but undecidable in G. To obtain our decidability result, we reduce Submonoid Membership in Y Zn to solving S-unit equations over Fp[X1, …, Xn]-modules. We show that the solution set of such equations is effectively p-automatic, extending a result of Adamczewski and Bell (2012). As an intermediate result, we also obtain that the solution set of the Knapsack Problem in Y Zn is effectively p-automatic.