On the Minimum Size of Signed Sumsets in Elementary Abelian Groups

For a finite abelian group $G$ and positive integers $m$ and $h$, we let $$\rho(G, m, h) = \min \{|hA| \; : \; A \subseteq G, |A|=m\}$$ and $$\rho_{\pm} (G, m, h) = \min \{|h_{\pm} A| \; : \; A \subseteq G, |A|=m\},$$ where $hA$ and $h_{\pm} A$ denote the $h$-fold sumset and the $h$-fold signed sumset of $A$, respectively. The study of $\rho(G, m, h)$ 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 $\rho_{\pm} (G, m, h)$ that we believe is exact, and proved that $\rho_{\pm} (G, m, h)$ agrees with $\rho (G, m, h)$ when $G$ is cyclic. Here we study $\rho_{\pm} (G, m, h)$ for elementary abelian groups $G$; in particular, we determine all values of $m$ for which $\rho_{\pm} (\mathbb{Z}_p^2, m, 2)$ equals $\rho (\mathbb{Z}_p^2, m, 2)$ for a given prime $p$.