A subset $S$ of an abelian group is a subgroup if and only if it is closed under taking differences; that is, the difference of any two elements of $S$ is in $S$. Suppose, however, that we only know that among any three elements of $S$, there are two the difference of which is in $S$; what can $S$ be in this case?
With a specific application in mind, I assume that $S$ is finite, symmetric, and contains $0$: $$ 0\in S=-S,\ |S|<\infty. $$
As an example, $S$ can be a symmetric coset progression, which is a set of the form $$ -ng+K,\dotsc,-g+K,K,g+K,\dotsc,ng+K, $$ where $K$ is a subgroup, and $g$ is a group element of order $2n+1$ at least.
A slightly different construction (suggested by Thomas Bloom's comment below): $$ S = \{0,g_1,g_2\}+H, $$ where $\mathrm{ord}(g_1)=\mathrm{ord}(g_2)=2$, $g_1\ne g_2$, and $H$ is a finite subgroup with $g_1,g_2,g_1+g_2\notin H$.
As an easy exercise, if in this case the underlying group is torsion-free, then $S$ is a symmetric arithmetic progression; hence, a coset progression.
The general problem is: What can the structure of $S$ be given that among any $N$ elements of $S$, there are two elements the difference of which is in $S$? (A multidimensional coset progression?)
