English

Quantum Hurwitz numbers and Macdonald polynomials

Mathematical Physics 2017-01-30 v3 High Energy Physics - Theory Combinatorics Group Theory math.MP Exactly Solvable and Integrable Systems

Abstract

Parametric families in the centre Z(C[Sn]){\bf Z}({\bf C}[S_n]) of the group algebra of the symmetric group are obtained by identifying the indeterminates in the generating function for Macdonald polynomials as commuting Jucys-Murphy elements. Their eigenvalues provide coefficients in the double Schur function expansion of 2D Toda τ\tau-functions of hypergeometric type. Expressing these in the basis of products of power sum symmetric functions, the coefficients may be interpreted geometrically as parametric families of quantum Hurwitz numbers, enumerating weighted branched coverings of the Riemann sphere. Combinatorially, they give quantum weighted sums over paths in the Cayley graph of SnS_n generated by transpositions. Dual pairs of bases for the algebra of symmetric functions with respect to the scalar product in which the Macdonald polynomials are orthogonal provide both the geometrical and combinatorial significance of these quantum weighted enumerative invariants.

Keywords

Cite

@article{arxiv.1504.03311,
  title  = {Quantum Hurwitz numbers and Macdonald polynomials},
  author = {J. Harnad},
  journal= {arXiv preprint arXiv:1504.03311},
  year   = {2017}
}

Comments

23 pages. Minor typos corrected. References updated. Scalar product for Jack polynomials corrected

R2 v1 2026-06-22T09:15:20.382Z