The permutation means the action of rearrangement of the elements for another in a set. More formally: The permutation π in Sn is defined as a bijection from a set Sn onto itself. All permutations of a set with n elements create a symmetric group Sn, where the group operation is function composition. It holds four group axioms for two permutations π and σ in Sn: closure, identity, invertibility, and associativity. The composition of two permutations is not commutative.
2) Combinatorics:
The permutation stands for a number of combinations when the order does not matter following this formula:
Examples
This notation means σ(1) = 2, σ(2) = 5, σ(3) = 4, σ(4) = 3, and σ(5) = 1
This figure depicts the graphical illustration of the notation.
Similar words to permutate /'pəːmjʊteɪt/ verb permutability /pəˌmjuːtə'bɪlɪti/ noun condition of being permutable permutable /pər'mjutəbəl/ adjective it is possible to permutate it permutant /pə'mjuːtənt/ noun the result from permutation permutated /'pəːmjʊteɪtɪd/ adjective it has been subjected to permutation permutating /'pəːmjʊteɪtɪŋ/ adjective undergoing permutation
Related terms Even permutation Odd permutation
Etymology From French permutation, Latin permūtātiōn-, permūtātiō, Anglo-Norman permutacioun, Anglo-Norman and Middle French permutacion