![]() The reflection about the 1,3−diagonal line is (24) and reflection about the 2,4−diagonal is (13). The reflection about the horizontal line through the center is given by (12)(34) and the corresponding vertical line reflection is (14)(23). The rotation by 90° (counterclockwise) about the center of the square is described by the permutation (1234). The symmetries are determined by the images of the vertices, that can, in turn, be described by permutations. ![]() Let the vertices of a square be labeled 1, 2, 3 and 4 (counterclockwise around the square starting with 1 in the top left corner). ![]() This permutation group is, as an abstract group, the Klein group V 4.Īs another example consider the group of symmetries of a square. G 1 forms a group, since aa = bb = e, ba = ab, and abab = e. This permutation, which is the composition of the previous two, exchanges simultaneously 1 with 2, and 3 with 4.Like the previous one, but exchanging 3 and 4, and fixing the others.This permutation interchanges 1 and 2, and fixes 3 and 4.This is the identity, the trivial permutation which fixes each element.The term permutation group thus means a subgroup of the symmetric group. The group of all permutations of a set M is the symmetric group of M, often written as Sym( M). ![]() In mathematics, a permutation group is a group G whose elements are permutations of a given set M and whose group operation is the composition of permutations in G (which are thought of as bijective functions from the set M to itself). ![]()
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