New constructions of signed difference sets

Abstract

Signed difference sets have interesting applications in communications and coding theory. A (v,k,λ)-difference set in a finite group G of order v is a subset D of G with k distinct elements such that the expressions xy-1 for all distinct two elements x,y∈ D, represent each non-identity element in G exactly λ times. A (v,k,λ)-signed difference set is a generalization of a (v,k,λ)-difference set D, which satisfies all properties of D, but has a sign for each element in D. We will show some new existence results for signed difference sets by using partial difference sets, product methods, and cyclotomic classes.