Permutation group 

The application of a permutation group to the elements being permuted is called its group action; it has applications in both the study of symmetries, combinatorics and many other branches of mathematics.

Examples

Permutations are often written in cyclic form, so that given the set M = {1,2,3,4}, a permutation g of M with g(1) = 2, g(2) = 4, g(4) = 1 and g(3) = 3 will be written as (1,2,4)(3), or more commonly, (1,2,4) since 3 is left unchanged.

Consider the following set of permutations G of the set M = {1,2,3,4}:

• e = (1)(2)(3)(4)
  • This is the identity, the trivial permutation which fixes each element.
• a = (12)(3)(4) = (12)
  • This permutation interchanges 1 and 2, and fixes 3 and 4.
• b = (1)(2)(34) = (34)
  • Like the previous one, but exchanging 3 and 4, and fixing the others.
• ab = (12)(34)
  • This permutation, which is the composition of the previous two, exchanges simultaneously 1 with 2, and 3 with 4.

G forms a group, since aa = bb = e, ba = ab, and ba'ba = e. So (G,M) forms a permutation group.

The group of all permutations of a set of n elements is the symmetric group S_n; if M is any finite or infinite set, then the group of all permutations of M is often written as Sym(M).

The Rubik's Cube puzzle is another example of a permutation group. The underlying set being permuted is the colored subcubes of the whole cube. Each of the rotations of the faces of the cube is a permutation of the positions and orientations of the subcubes. Taken together, the rotations form a generating set, which in turn generates a group by composition of these rotations. The axioms of a group are easily seen to be satisfied; to invert any sequence of rotations, simply perform their opposites, in reverse order.

The group of permutations on the Rubik's Cube doesn't form a complete symmetric group of the 20 corner and face cubelets; there are some final cube positions which cannot be achieved through the legal manipulations of the cube.

More generally, every group G is isomorphic to a permutation group by virtue of its action on G as a set; this is the content of Cayley's Theorem.

Isomorphisms

If G and H are two permutation groups on the same set S, then we say that G and H are isomorphic as permutation groups if there exists a bijective map f : S → S such that r |-> f ^-1 o r o f defines a bijective map between G and H; in other words, if for each element g in G, there is a unique h_g in H such that for all s in S, (g o f)(s) = (f o h_g)(s). In this case, G and H are also isomorphic as groups.

Notice that different permutation groups may well be isomorphic as abstract groups, but not as permutation groups. For instance, the permutation group on {1,2,3,4} described above is isomorphic as a group (but not as a permutation group) to {(1)(2)(3)(4), (12)(34), (13)(24), (14)(23)}. Both are isomorphic as groups to the Klein group V₄.

If (G,M) and (H,M) such that both G and H are isomorphic as groups to Sym(M), then (G,M) and (H,M) are isomorphic as permutation groups; thus it is appropriate to talk about the symmetric group Sym(M) (up to isomorphism).

See Also

• Group action