English

Bispectral and $(\glN,\glM)$ Dualities

Quantum Algebra 2007-05-23 v1

Abstract

Let V=<pij(x)e\laix,i=1,...,n,j=1,...,Ni>V = < p_{ij}(x)e^{\la_ix}, i=1,...,n, j=1, ..., N_i > be a space of quasi-polynomials of dimension N=N1+...+NnN=N_1+...+N_n. Define the regularized fundamental operator of VV as the polynomial differential operator D=i=0NANi(x)\piD = \sum_{i=0}^N A_{N-i}(x)\p^i annihilating VV and such that its leading coefficient A0A_0 is a polynomial of the minimal possible degree. We construct a space of quasi-polynomials U=<qab(u)ezau>U = < q_{ab}(u)e^{z_au} > whose regularized fundamental operator is the differential operator i=0NuiANi(u)\sum_{i=0}^N u^i A_{N-i}(\partial_u). The space UU is constructed from VV by a suitable integral transform. Our integral transform corresponds to the bispectral involution on the space of rational solutions (vanishing at infinity) to the KP hierarchy, see \cite{W}. As a corollary of the properties of the integral transform we obtain a correspondence between critical points of the two master functions associated with the (\glN,\glM)(\glN,\glM) dual Gaudin models as well as between the corresponding Bethe vectors.

Keywords

Cite

@article{arxiv.math/0510364,
  title  = {Bispectral and $(\glN,\glM)$ Dualities},
  author = {E. Mukhin and V. Tarasov and A. Varchenko},
  journal= {arXiv preprint arXiv:math/0510364},
  year   = {2007}
}