Key points are not available for this paper at this time.
A matching from a finite subset Aⁿ to another subset Bⁿ is a bijection f: A B with the property that a+f (a) never lies in A. A matching is called acyclic if it is uniquely determined by its multiplicity function. Alon et al. established the acyclic matching property for Zⁿ, which was later extended to all abelian torsion-free groups. In a prior work, the authors of this paper settled the acyclic matching property for all abelian groups. The objective of this note is to explore a related concept, known as the weak acyclic matching property, within the context of abelian groups.
Aliabadi et al. (Mon,) studied this question.