Partitions, Vertex Operator Constructions and Multi-component KP equations
Abstract
For every partition of a positive integer n in k parts and every point of an infinite Grassmannian we obtain a solution of the k component differential-difference KP hierarchy and a corresponding Baker function. A partition of n also determines a vertex operator construction of the fundamental representations of the infinite matrix algebra gl∞ and hence a τ function. We use these fundamental representations to study the Gauss decomposition in the infinite matrix group Gl∞ and to express the Baker function in terms of τ-functions. The reduction to loop algebras is discussed.
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