Infinite co-minimal pairs in the integers and integral lattices

Abstract

Given two nonempty subsets A, B of a group G, they are said to form a co-minimal pair if A · B = G, and A' · B ⊂neq G for any ≠ A' ⊂neq A and A· B' ⊂neq G for any ≠ B' ⊂neq B. In this article, we show several new results on co-minimal pairs in the integers and the integral lattices. We prove that for any d≥ 1, the group Z2d admits infinitely many automorphisms such that for each such automorphism σ, there exists a subset A of Z2d such that A and σ(A) form a co-minimal pair. The existence and construction of co-minimal pairs in the integers with both the subsets A and B (A≠ B) of infinite cardinality was unknown. We show that such pairs exist and explicitly construct these pairs satisfying a number of algebraic properties.