Derangement
derangement
A permutation of elements in which the element cannot occupy the -th position, . The problem of calculating the number of derangements is known as the "Montmort matching problem" or "problème des rencontres" (cf. Classical combinatorial problems. The following formula holds:
Derangements are a special case of permutations satisfying a specific restriction on the position of the permuted elements. For example, the "problème des ménages" consists in calculating the number of permutations conflicting with the two permutations and . (Two permutations of elements are called conflicting if the -th element occupies different positions in each of them for all ). The number is given by the formula:
The number of Latin squares (cf. Latin square) of size for can be calculated in terms of and by the formulas
References
[1] | H.J. Ryser, "Combinatorial mathematics" , Carus Math. Monogr. , 14 , Wiley & Math. Assoc. Amer. (1963) |
[2] | J. Riordan, "An introduction to combinatorial mathematics" , Wiley (1958) |
Derangement. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Derangement&oldid=39881