2D Toda τ Functions, Weighted Hurwitz Numbers and the Cayley Graph: Determinant Representation and Recursion Formula
Abstract
We generalize the determinant representation of the KP τ functions to the case of the 2D Toda τ functions. The generating functions for the weighted Hurwitz numbers are a parametric family of 2D Toda τ functions; for which we give a determinant representation of weighted Hurwitz numbers. Then we can get a finite-dimensional equation system for the weighted Hurwitz numbers HdG(σ,ω) with the same dimension |σ|=|ω|=n. Using this equation system, we calculated the value of the weighted Hurwitz numbers with dimension 0,\,1,\,2 and give a recursion formula to calculating the higher dimensional weighted Hurwitz numbers. For any given weighted generating function G(z), the weighted Hurwitz number degenerates into the Hurwitz numbers when d=0. We get a matrix representation for the Hurwitz numbers. The generating functions of weighted paths in the Cayley graph of the symmetric group are a parametric family of 2D Toda τ functions; for which we obtain a determinant representation of weighted paths in the Cayley graph.
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