On the Minimum Size of Signed Sumsets in Elementary Abelian Groups

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. In previous work we provided an upper bound for (G, m, h) that we believe is exact, and proved that (G, m, h) agrees with (G, m, h) when G is cyclic. Here we study (G, m, h) for elementary abelian groups G; in particular, we determine all values of m for which (Zp2, m, 2) equals (Zp2, m, 2) for a given prime p.