The complexity of intersecting subproducts with subgroups in Cartesian powers

Abstract

Given a finite abelian group G and t∈ N, there are two natural types of subsets of the Cartesian power Gt; namely, Cartesian powers St where S is a subset of G, and (cosets of) subgroups H of Gt. A basic question is whether two such sets intersect. In this paper, we show that this decision problem is NP-complete. Furthermore, for fixed G and S we give a complete classification: we determine conditions for when the problem is NP-complete, and show that in all other cases the problem is solvable in polynomial time. These theorems play a key role in the classification of algebraic decision problems in finitely generated rings developed in [Spe21].

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