Vertex Operators and Solitons of Constrained KP Hierarchies

Abstract

We construct the vertex operator representation for the Affine Kac-Moody SL(M+K+1) algebra, which is relevant for the construction of the soliton solutions of the constrained KP hierarchies. The oscillators involved in the vertex operator construction are provided by the Heisenberg subalgebras of SL(M+K+1) realized in the unconventional gradations. The well-known limiting cases are the homogeneous Heisenberg subalgebra of SL(M+1) and the principal Heisenberg subalgebra of sl(K+1). The explicit example of M=K=1 is discussed in detail and the corresponding soliton solutions and tau-functions are given.

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