Multiply transitive group action
A group acts 2-transitively on a set if it acts transitively on the set of distinct ordered pairs. That is, assuming that acts on the left of, for each pair of pairs with and, there exists a such that.
The group action is sharply 2-transitive if such is unique.
A 2-transitive group is a group such that there exists a group action that's 2-transitive and faithful. Similarly we can define sharply 2-transitive group.
Equivalently, and, since the induced action on the distinct set of pairs is.
The definition works in general with k replacing 2. Such multiply transitive permutation groups can be defined for any natural number k. Specifically, a permutation group G acting on n points is k-transitive if, given two sets of points a1,... ak and b1,... bk with the property that all the ai are distinct and all the bi are distinct, there is a group element g in G which maps ai to bi for each i between 1 and k. The Mathieu groups are important examples.
Examples
Every group is trivially sharply 1-transitive, by its action on itself by left-multiplication.Let be the symmetric group acting on, then the action is sharply n-transitive.
The group of n-dimensional similarities acts 2-transitively on. In the case this action is sharply 2-transitive, but for it is not.
The group of n-dimensional projective transforms almost acts sharply -transitively on the n-dimensional real projective space. The almost is because the points must be in general linear position. In other words, the n-dimensional projective transforms act transitively on the space of projective frames of.