Signed permutation statistics

Victor Reiner

doi:10.1006/eujc.1993.1058

Signed permutation statistics

Victor Reiner

Mathematics

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Abstract

We derive multivariate generating functions that count signed permutations by various statistics, using the hyperoactahedral generalization of methods of Garsia and Gessel. We also derive the distributions over inverse descent classes of signed permutations for two of these statistics individually (the major index and inversion number). These results show that, in contrast to the case for (unsigned) permutations, these two statistics are not generally equidistributed. We also discuss applications to statistics on the wreath product C_k ʅ S_n of a cyclic group with the symmetric group.

Original language	English (US)
Pages (from-to)	553-567
Number of pages	15
Journal	European Journal of Combinatorics
Volume	14
Issue number	6
DOIs	https://doi.org/10.1006/eujc.1993.1058
State	Published - Nov 1993

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abstract = "We derive multivariate generating functions that count signed permutations by various statistics, using the hyperoactahedral generalization of methods of Garsia and Gessel. We also derive the distributions over inverse descent classes of signed permutations for two of these statistics individually (the major index and inversion number). These results show that, in contrast to the case for (unsigned) permutations, these two statistics are not generally equidistributed. We also discuss applications to statistics on the wreath product Ck ʅ Sn of a cyclic group with the symmetric group.",

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Signed permutation statistics

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