Signed Difference Sets

Abstract

A (v,k,λ) difference set in a group G of order v is a subset \d1, d2, …,dk\ of G such that D=Σ di in the group ring Z[G] satisfies D D-1 = n + λ G, where n=k-λ. If D=Σ si di, where the si ∈ \ 1\, satisfies the same equation, we will call it a signed difference set. This generalizes both difference sets (all si=1) and circulant weighing matrices (G cyclic and λ=0). We will show that there are other cases of interest, and give some results on their existence.

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