Abstract
The fundamental properties of the multi-component nonlinear Schrodinger (MNLS) type models related to symmetric spaces are analyzed. New types of reductions of these systems are constructed. The Lax operators L and the corresponding recursion operators Λ are used to formulate some of the fundamental properties of the MNLS-type equations. The results are illustrated by specific examples of MNLS-type systems related to the D.III symmetric space for the so(8)-algebra. The effect of the reductions on their soliton solutions is outlined.
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