Matrix model generating function for quantum weighted Hurwitz numbers. (English) Zbl 1511.05008
Summary: The KP \(\tau\)-function of hypergeometric type serving as generating function for quantum weighted Hurwitz numbers is used to compute the Baker function and the corresponding adapted basis elements, expressed as absolutely convergent Laurent series in the spectral parameter. These are equivalently expressed as Mellin-Barnes integrals, analogously to Meijer \(G\)-functions, but with an infinite product of \(\Gamma\)-functions as integral kernel. A matrix model representation is derived for the \(\tau\)-function evaluated at trace invariants of an externally coupled matrix.
MSC:
| 05A15 | Exact enumeration problems, generating functions |
| 14H81 | Relationships between algebraic curves and physics |
| 33C67 | Hypergeometric functions associated with root systems |
Keywords:
quantum Hurwitz numbers; generating function; matrix integral; quantum Hurwitz numbers; KP \(\tau\)-function; hypergeometric \(\tau\)-functionSoftware:
DLMFReferences:
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