We find an explicit combinatorial interpretation of the coefficients of Kerov
character polynomials which express the value of normalized irreducible
characters of the symmetric groups S(n) in terms of free cumulants R_2,R_3,...
of the corresponding Young diagram. Our interpretation is based on counting
certain factorizations of a given permutation

Dołega, Maciej

Féray, Valentin

Sniady, Piotr

English

arXiv

AbstractWe find an explicit combinatorial interpretation of the coefficients of Kerov character polynomials which express the value of normalized irreducible characters of the symmetric groups S(n) in terms of free cumulants R2,R3,… of the corresponding Young diagram. Our interpretation is based on counting certain factorizations of a given permutation

Dołęga, Maciej

Śniady, Piotr

Elsevier - Publisher Connector 

Explicit combinatorial interpretation of Kerov character polynomials as numbers of permutation factorizations 

International audienceWe find an explicit combinatorial interpretation of the coefficients of Kerov character polynomials which express the value of normalized irreducible characters of the symmetric groups S(n) in terms of free cumulants R_2,R_3,... of the corresponding Young diagram. Our interpretation is based on counting certain factorizations of a given permutation

Dolega, Maciej

HAL - UPEC / UPEM

Explicit combinatorial interpretation of Kerov character polynomials as numbers of permutation factorizations

HAL-Ecole des Ponts ParisTech

https://hal.archives-ouvertes.fr/hal-00418456

Explicit combinatorial interpretation of Kerov character polynomials as numbers of permutation factorizations

Abstract

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Elsevier - Publisher Connector

HAL - UPEC / UPEM

HAL-Ecole des Ponts ParisTech

Elsevier - Publisher Connector