Let $(G, X)$ be a permutation group with domain $X$. Let $O=\{o_1,\dots,o_m\}$ be the set of orbits of $G$. I am interested in generating sets $S$ with the following property:
Let $g\in S$ be a generator. Write $g$ as $\prod_{i=1}^m g_i$ such that $g_i$ moves only points in $o_i$, that is, $g_i$ coincides with $g$ on $o_i$ and is the identity elsewhere. Then there is no non-empty subset of non-identity elements in $\{g_1,\dots,g_m\}$ whose product is not $g$ and is in $G$.
For example, the two generating sets \begin{align*} &(1,2,3)(4,5,6)(7,8,9)(10,11),\; (1,2,3)(4,5,6)(7,9,8)\quad\text{and}\\ &(1,2,3)(4,5,6),\; (7,8,9),\;(10,11) \end{align*} generate the same group $G$, with orbits $o_1=\{1,2,3\}$, $o_2=\{4,5,6\}$, $o_3=\{7,8,9\}$ and $o_4=\{10,11\}$. The first of the two generating sets does not have the desired property, because $(1,2,3)(4,5,6)$ is in $G$ (or also $(10,11)$), whereas the second does.
- Does this property, or a generating set with this property, have a name?
- Is there a fast way to produce such a generating set (other than testing all subsets)?
