Let $G$ be a transitive group on $\Omega$. Every orbits of $G$ on its natural action on $\Omega\times\Omega$ is called an orbital of $G$ on $\Omega$. For each orbital $\Delta$ of $G$ on $\Omega$, the orbital digraph $Graph(\Delta)$ is a digraph with vertex set $\Omega$ and edge set $\Delta$. Clearly, $G$ is a subgroup of automorphism group of $Graph(\Delta)$. Is there any paper or book that determine for which groups $G$, there is an orbital $\Delta$ that $G$ is equal to the automorphism group of $Graph(\Delta)$? Clearly, the action of $S_5$ on 2-subets of $\{1,\ldots,5\}$ is an example.
$\begingroup$
$\endgroup$
Add a comment
|
1 Answer
$\begingroup$
$\endgroup$
3
The property of $G$ you are looking at is called 2-closure, i.e., you ask for a classification of 2-closed permutation groups. See the paper by Liebeck, Praeger, Saxl, On the 2-closures of finite permutation groups. J. London Math. Soc. (2) 37 (1988), no. 2, 241–252, where this question is investigated for a particular class of primitive permutation groups.
More precisely, this is not 100% equivalent to your question (it would be, if you allowed graphs have coloured arcs), as there exist 2-closed permutation groups $G$ such that for each orbital the automorphism group of the underlying (di)graph is strictly bigger than $G$.
In general such a classification is not known, and the problem is hopelessly hard, I think.
answered Jan 1, 2013 at 17:01
-
1$\begingroup$ @Dima: Couldn't it be true that $G$ is 2-closed, but is not the full automorphism group of one of its orbitals? But I cannot think of any better reference, and I agree with your assessment of the difficulty. $\endgroup$ Commented Jan 1, 2013 at 17:41
-
$\begingroup$ Thanks for the reference. The thesis of Jing Xu, On closure of finite permutation groups, The university of Western Australia, 2005, is another good reference. $\endgroup$ Commented Jan 2, 2013 at 7:39
-
$\begingroup$ @Chris: you are right, automorphism groups of association schemes corresponding to mutually orthogonal Latin squares (take the set of Latin squares corresponding to a Desarguesian finite affine plane) provide examples of this phenomenon. $\endgroup$ Commented Jan 2, 2013 at 14:11