合理加权Hurwitz数的星座和$\tau$-函数

J. Harnad, B. Runov
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引用次数: 2

摘要

加权星座给出黎曼球的加权分支覆盖的图形表示。它们被引入以提供$2$D Toda $\tau$-超几何型函数的组合解释,在多项式权重生成函数的情况下作为加权Hurwitz数的生成函数。给定加权星座的所有顶点和边权的乘积,对所有构型求和,得到$\tau$-函数。在目前的工作中,这被推广到星座,其中的加权参数是由一个合理的权重生成函数确定的。相关的$\tau$-函数可以表示为双标记加权星座的权重和,每个分支覆盖的等价类都有两种加权参数。分支点的双重标记,被称为“颜色”和“味道”指数,是由于以下事实所要求的:在权重生成函数的泰勒展开中,分母参数中的特定颜色可能出现乘法,而味道标签表明了这种多重性。
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Constellations and $\tau$-functions for rationally weighted Hurwitz numbers
Weighted constellations give graphical representations of weighted branched coverings of the Riemann sphere. They were introduced to provide a combinatorial interpretation of the $2$D Toda $\tau$-functions of hypergeometric type serving as generating functions for weighted Hurwitz numbers in the case of polynomial weight generating functions. The product over all vertex and edge weights of a given weighted constellation, summed over all configurations, reproduces the $\tau$-function. In the present work, this is generalized to constellations in which the weighting parameters are determined by a rational weight generating function. The associated $\tau$-function may be expressed as a sum over the weights of doubly labelled weighted constellations, with two types of weighting parameters associated to each equivalence class of branched coverings. The double labelling of branch points, referred to as "colour" and "flavour" indices, is required by the fact that, in the Taylor expansion of the weight generating function, a particular colour from amongst the denominator parameters may appear multiply, and the flavour labels indicate this multiplicity.
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