The matrix model for hypergeometric Hurwitz numbers
Abstract
We present the multi-matrix models that are the generating functions for branched covers of the complex projective line ramified over fixed points , , (generalized Grotendieck's dessins d'enfants) of fixed genus, degree, and the ramification profiles at two points, and . We take a sum over all possible ramifications at other points with the fixed length of the profile at and with the fixed total length of profiles at the remaining points. All these models belong to a class of hypergeometric Hurwitz models thus being tau functions of the Kadomtsev--Petviashvili (KP) hierarchy. In the case described above, we can present the obtained model as a chain of matrices with a (nonstandard) nearest-neighbor interaction of the type . We describe the technique for evaluating spectral curves of such models, which opens the possibility of applying the topological recursion for developing -expansions of these model. These spectral curves turn out to be of an algebraic type.
Cite
@article{arxiv.1409.3553,
title = {The matrix model for hypergeometric Hurwitz numbers},
author = {Jan Ambjorn and Leonid Chekhov},
journal= {arXiv preprint arXiv:1409.3553},
year = {2015}
}
Comments
12 pages, 2 figures in LaTeX, contribution to the volume of TMPh celebrating the 75th birthday of A A Slavnov