Integrability of Hurwitz Partition Functions. I. Summary

Abstract

Partition functions often become τ-functions of integrable hierarchies, if they are considered dependent on infinite sets of parameters called time variables. The Hurwitz partition functions Z = ΣR dR2-kR(t(1))...R(t(k))(Σn nCR(n)) depend on two types of such time variables, t and . KP/Toda integrability in t requires that k≤ 2 and also that CR(n) are selected in a rather special way, in particular the naive cut-and-join operators are not allowed for n>2. Integrability in further restricts the choice of CR(n), forbidding, for example, the free cumulants. It also requires that k≤ 1. The quasiclassical integrability (the WDVV equations) is naturally present in variables, but also requires a careful definition of the generating function.