Group action
In mathematics, a group action is a relation between a group G and a set X in which the elements of G act as operations on the set.
Formally, a group action is a map from the Cartesian product , written as or or satisfying the following properties:
From these we deduce that , so that each group element acts as an invertible function on X, that is, as a permutation of X.
If we let denote the permutation associated with action by the group element , then the map from G to the symmetric group on X is a group homomorphism, and every group action arises in this way. We may speak of the action as a permutation representation of G. The kernel of the map A is also called the kernel of the action, and a faithful action is one with trivial kernel. Since we have
where K is the kernel of the action, there is no loss of generality in restricting consideration to faithful actions where convenient.
Examples
- Any group acts on any set by the trivial action in which .
- The symmetric group acts of X by permuting elements in the natural way.
- The automorphism group of an algebraic structure acts on the structure.
Stabilisers
The stabiliser of an element x of X is the subset of G which fixes x:
The stabiliser is a subgroup of G.
Orbits
The orbit of any x in X is the subset of X which can be "reached" from x by the action of G:
The orbits partition the set X: they are the equivalence classes for the relation Failed to parse (SVG (MathML can be enabled via browser plugin): Invalid response ("Math extension cannot connect to Restbase.") from server "https://wikimedia.org/api/rest_v1/":): {\displaystyle \stackrel{G}{\sim}<\math> define by :<math>x \stackrel{G}{\sim} y \Leftrightarrow \exists g \in G, y = x^g . \, }
If x and y are in the same orbit, their stabilisers are conjugate.
A fixed point of an action is just an element x of X such that for all g in G: that is, such that .
Examples
- In the trivial action, every point is a fixed point and the orbits are all singletons.
- Let be a permutation in the usual action of on . The cyclic subgroup <math\langle \pi \rangle</math> generated by acts on X and the orbits are the cycles of .
Transitivity
An action is transitive or 1-transitive if for any x and y in X there exists a g in G such that . Equivalently, the action is transitive if it has only one orbit.