Characterising bimodal collections of sets in finite groups

Abstract

A collection of disjoint subsets A=\A1,A2,…c,Am\ of a finite abelian group is said to have the bimodal property if, for any non-zero group element δ, either δ never occurs as a difference between an element of Ai and an element of some other set Aj, or else for every element ai in Ai there is an element aj∈ Aj for some j≠ i such that ai-aj=δ. This property arises in various familiar situations, such as the cosets of a fixed subgroup or in a group partition, and has applications to the construction of optimal algebraic manipulation detection (AMD) codes. In this paper, we obtain a structural characterisation for bimodal collections of sets.