Vector NLS hierarchy solitons revisited: dressing transformation and tau function approach
Abstract
We discuss some algebraic aspects of the integrable vector non-linear Schr\"odinger hierarchies (GNLSr). These are hierarchies of zero-curvature equations constructed from affine Kac-Moody algebras slr+1. Using the dressing transformation method and the tau-function formalism, we construct the N-soliton solutions of the GNLSr systems. The explicit matrix elements in the case of GNLS1 are computed using level one vertex operator representations.
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