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Geometric interpretation of Zhou's explicit formula for the Witten-Kontsevich tau function

Based on the work of Itzykson and Zuber on Kontsevich's integrals, we give a geometric interpretation and a simple proof of Zhou's explicit formula for the Witten-Kontsevich tau function. More precisely, we show that the numbers $A_{m,n}^{Zhou}$ defined by Zhou coincide with the affine coordinates for the point of the Sato Grassmannian corresponding to the Witten-Kontsevich tau function. Generating functions and new recursion relations for $A_{m,n}^{Zhou}$ are derived. Our formulation on matrix-valued affine coordinates and on tau functions remains valid for generic Grassmannian solutions of the KdV hierarchy. A by-product of our study indicates an interesting relation between the matrix-valued affine coordinates for the Witten-Kontsevich tau function and the $V$-matrices associated to the $R$-matrix of Witten's $3$-spin structures.

preprint2015arXivOpen access
Ferenc BaloghDi Yang
math-phmath.MPnlin.SI
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Ferenc BaloghDi Yang

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