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A cyclic permutation consisting of a single 8-cycle. There is not widespread consensus about the precise definition of a cyclic permutation. Some authors define a permutation σ of a set X to be cyclic if "successive application would take each object of the permuted set successively through the positions of all the other objects", [1] or, equivalently, if its representation in cycle notation ...
The size n of the orbit is called the length of the corresponding cycle; when n = 1, the single element in the orbit is called a fixed point of the permutation. A permutation is determined by giving an expression for each of its cycles, and one notation for permutations consist of writing such expressions one after another in some order.
Not all permutations are cyclic permutations, but every permutation can be written as a product [5] of disjoint (having no common element) cycles in essentially one way. [6] As a permutation may have fixed points (elements that are unchanged by the permutation), these will be represented by cycles of length one.
Zaks' prefix reversal algorithm: [60] in each step, a prefix of the current permutation is reversed to obtain the next permutation; Sawada-Williams' algorithm: [ 61 ] each permutation differs from the previous one either by a cyclic left-shift by one position, or an exchange of the first two entries;
A cyclic number is an integer for which cyclic permutations of the digits are successive integer multiples of the number. The most widely known is the six-digit number 142857, whose first six integer multiples are 142857 × 1 = 142857 142857 × 2 = 285714 142857 × 3 = 428571 142857 × 4 = 571428 142857 × 5 = 714285 142857 × 6 = 857142
Repeat from step 2 until all the numbers have been struck out. The sequence of numbers written down in step 3 is now a random permutation of the original numbers. Provided that the random numbers picked in step 2 above are truly random and unbiased, so will be the resulting permutation.
In three dimensions only, the cyclic permutations of (1, 2, 3) are all even permutations, similarly the anticyclic permutations are all odd permutations. This means in 3d it is sufficient to take cyclic or anticyclic permutations of (1, 2, 3) and easily obtain all the even or odd permutations.
Any circulant is a matrix polynomial (namely, the associated polynomial) in the cyclic permutation matrix: = + + + + = (), where is given by the companion matrix = []. The set of n × n {\displaystyle n\times n} circulant matrices forms an n {\displaystyle n} - dimensional vector space with respect to addition and scalar multiplication.