The Minimum Size of Signed Sumsets
Abstract
For a finite abelian group G and positive integers m and h, we let (G, m, h) = \|hA| \; : \; A ⊂eq G, |A|=m\ and (G, m, h) = \|h A| \; : \; A ⊂eq G, |A|=m\, where hA and h A denote the h-fold sumset and the h-fold signed sumset of A, respectively. The study of (G, m, h) has a 200-year-old history and is now known for all G, m, and h. Here we prove that (G, m, h) equals (G, m, h) when G is cyclic, and establish an upper bound for (G, m, h) that we believe gives the exact value for all G, m, and h.
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