On an extension of the generalized BGW tau-function

Abstract

For an arbitrary solution to the Burgers--KdV hierarchy, we define the tau-tuple (τ1,τ2) of the solution. We show that the product τ1τ2 admits Buryak's residue formula. Therefore, according to Alexandrov's theorem, τ1τ2 is a tau-function of the KP hierarchy. We then derive a formula for the affine coordinates for the point of the Sato Grassmannian corresponding to the tau-function τ1τ2 explicitly in terms of those for τ1. Applications to the analogous open extension of the generalized BGW tau-function and to the open partition function are given.