English

Macdonald-Hurwitz Number

Symplectic Geometry 2023-02-22 v4 Mathematical Physics Algebraic Geometry math.MP

Abstract

Inspired by J. Novak's works on the asymptotic behavior of the BGW and the HCIZ matrix integrals \cite{[N0]} and by the algebraic and geometric properties of the Hurwitz numbers \cite{[IP]}, \cite{[LZZ]}, \cite{[LR]}, \cite{[OP]}, \cite{[Z1]}, and by the symplectic surgery theory of the relative GW-invariants \cite{[IP]}, \cite{[LR]}, using the elements of the transform matrix from the integral Macdonald function with two parameters to the homogeneous symmetric power sum functions \cite{[M]}, we have constructed the Macdonald-Hurwitz numbers. As an application, we have constructed a series of new genus-expanded cut-and-join differential operators, which can be thought of as the generalization of the Laplace-Beltrami operators and have the genus-expanded integral Macdonald functions as their common eigenfunctions. We have also obtained some generating wave functions of the same degree, which are generated by the Macdonald-Hurwitz numbers and can be expressed in terms of the new cut-and-join differential operators and the initial values. Another application is that we have constructed a new commutative associative algebra (C(F[Sd]),q,t)(C(\mathbb{F}[S_{d}]),\circ_{q,t}) (referring to the last section (6)). By taking the limit along a special path η(AB)\eta(A|B) (referring to the formulas (140), (141)), we specialize (C(F[Sd]),q,t)(C(\mathbb{F}[S_{d}]),\circ_{q,t}) to be a commutative associative algebra (C(F^[Sd]),AB)(C(\hat{\mathbb{F}}[S_{d}]),\circ_{A|B}), which will be proven to be isomorphic to the middle-dimensional C\mathbb{\mathbb{C}^*}-equivalent cohomological rings via the Jack functions over the Hilbert scheme points of C2\mathbb{C}^2 constructed by W. Li, Z. Qin, and W. Wang in \cite{[LQW2]}.}

Keywords

Cite

@article{arxiv.2211.11375,
  title  = {Macdonald-Hurwitz Number},
  author = {Quan Zheng},
  journal= {arXiv preprint arXiv:2211.11375},
  year   = {2023}
}

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R2 v1 2026-06-28T06:21:36.266Z