English

Science Fiction and Macdonald's Polynomials

Combinatorics 2007-05-23 v1 Quantum Algebra

Abstract

This work studies the remarkable relationships that hold among certain m-tuples of the Garsia-Haiman modules Mμ {\bf M}_\mu and corresponding elements of the Macdonald basis. We recall that Mμ{\bf M}_\mu is defined for a partition μ\partn\mu\part n, as the linear span of derivatives of a certain bihomogeneous polynomial Δμ(x,y)\Delta_ \mu(x,y) in the variables x1,x2,...,xn,y1,y2,...,ynx_1,x_2,..., x_n, y_1,y_2,..., y_n. It has been conjectured by Garsia and Haiman that Mμ{\bf M}_\mu has n!n! dimensions and that its bigraded Frobenius characteristic is given by the symmetric polynomial H~μ(x;q,t)=λ\partnSλ(X)K~λμ(q,t){\widetilde{H}}_\mu(x;q,t)=\sum_{\lambda\part n} S_\lambda(X) {\widetilde{K}}_{\lambda\mu}(q,t) where the K~λμ(q,t){\widetilde{K}}_{\lambda\mu}(q,t) are related to the Macdonald q,tq,t-Kostka coefficients Kλμ(q,t) K_{\lambda\mu}(q,t) by the identity K~λμ(q,t)=Kλμ(q,1/t)tn(μ){\widetilde{K}}_{\lambda\mu}(q,t)=K_{\lambda\mu}(q,1/t)t^{n(\mu)} with n(μ)n(\mu) the x-degree of Δμ(x;y)\Delta_ \mu(x;y). Computer data has suggested that as ν\nu varies among the immediate predecessors of a partition μ\mu, the spaces Mν{\bf M}_\nu behave like a boolean lattice. We formulate a number of remarkable conjectures about the Macdonald polynomials. In particular we obtain a representation theoretical interpretation for some of the symmetries that can be found in the computed tables of q,tq,t-Kostka coefficients.

Keywords

Cite

@article{arxiv.math/9809128,
  title  = {Science Fiction and Macdonald's Polynomials},
  author = {F. Bergeron and G. Garsia},
  journal= {arXiv preprint arXiv:math/9809128},
  year   = {2007}
}

Comments

47 pages, TeX