Restricted Sumsets in Finite Nilpotent Groups
arXiv:1206.6160
Abstract
Suppose that $A,B$ are two non-empty subsets of the finite nilpotent group $G$. If $A\not=B$, then the cardinality of the restricted sumset $$A\dotplus B={a+b: a\in A, b\in B, a\neq b} $$ is at least $$\min{p(G),|A|+|B|-2},$$ where $p(G)$ denotes the least prime factor of $|G|$.
This is a preliminary draft, which maybe contains some mistakes. Now Theorem 1.2 has been extended to general finite groups