28.4 PERMUTATION GROUPS
Suppose thatφis the permutation [4 5 3 6 2 1]; then
φ•θ{abcdef}=[453621][256143]{abcdef}=[453621]{befadc}={adfceb}=[146352]{abcdef}.Written in terms of the permutation notation this result is
[453621][256143]=[146352].A concept that is very useful for working with permutations is that of decom-position into cycles. The cycle notation is most easily explained by example. For
the permutationθgiven above:
the 1st object,a, has been replaced by the 2nd,b;
the 2nd object,b, has been replaced by the 5th,e;
the 5th object,e, has been replaced by the 4th,d;
the 4th object,d, has been replaced by the 1st,a.This brings us back to the beginning of a closed cycle, which is conveniently
represented by the notation (1 2 5 4), in which the successive replacement
positionsareenclosed,insequence,inparentheses.Thus(1254)means2nd
→1st, 5th→2nd, 4th→5th, 1st→4th. It should be noted that the object
initially in the first listed position replaces that in the final position indicated in
the bracket – here ‘a’ is put into the fourth position by the permutation. Clearly
the cycle (5 4 1 2), or any other that involved the same numbers in the same
relative order, would have exactly the same meaning and effect. The remaining
two objects,candf, are interchanged byθor, more formally, are rearranged
according to a cycle of length 2, atransposition, represented by (3 6). Thus the
complete representation (specification) ofθis
θ=(1254)(36).The positions of objects that are unaltered by a permutation are either placed by
themselves in a pair of parentheses or omitted altogether. The former is recom-
mended as it helps to indicate how many objects are involved – important when
the object in the last position is unchanged, or the permutation is the identity,
which leaves all objects unaltered in position! Thus the identity permutation of
degree 6 is
I= (1)(2)(3)(4)(5)(6),though in practice it is often shortened to (1).
It will be clear that the cycle representation is unique, to within the internalabsolute ordering of the numbers in each bracket as already noted, and that