English

Pieri-type formulas for the non-symmetric Jack polynomials

Quantum Algebra 2007-05-23 v1

Abstract

In the theory of symmetric Jack polynomials the coefficients in the expansion of the ppth elementary symmetric function ep(z)e_p(z) times a Jack polynomial expressed as a series in Jack polynomials are known explicitly. Here analogues of this result for the non-symmetric Jack polynomials Eη(z)E_\eta(z) are explored. Necessary conditions for non-zero coefficients in the expansion of ep(z)Eη(z)e_p(z) E_\eta(z) as a series in non-symmetric Jack polynomials are given. A known expansion formula for ziEη(z)z_i E_\eta(z) is rederived by an induction procedure, and this expansion is used to deduce the corresponding result for the expansion of j=1,jiNzjEη(z)\prod_{j=1, j\ne i}^N z_j E_\eta(z), and consequently the expansion of eN1(z)Eη(z)e_{N-1}(z) E_\eta(z). In the general pp case the coefficients for special terms in the expansion are presented.

Cite

@article{arxiv.math/0006006,
  title  = {Pieri-type formulas for the non-symmetric Jack polynomials},
  author = {P. J. Forrester and D. S. McAnally},
  journal= {arXiv preprint arXiv:math/0006006},
  year   = {2007}
}

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19 pages