Tau Functions of (n,1) curves and Soliton Solutions on Non-Zero Constant Backgrounds

Abstract

We study the tau function of the KP-hierarchy associated with an (n,1) curve yn=x-α. If α=0 the corresponding tau function is 1. On the other hand if α≠ 0 the tau function becomes the exponential of a quadratic function of the time variables. By applying vertex opertaors to the latter we obtain soliton solutions on non-zero constant backgrounds.