Symmetries for exact solutions to the nonlinear Schrodinger equation

A certain symmetry is exploited in expressing exact solutions to the focusing nonlinear Schrodinger equation in terms of a triplet of constant matrices. Consequently, for any number of bound states with any number of multiplicities the corresponding soliton solutions are explicitly written in a compact form in terms of a matrix triplet. Conversely, from such a soliton solution the corresponding transmission coefficients, bound-state poles, bound-state norming constants and Jost solutions for the associated Zakharov-Shabat system are evaluated explicitly. These results also hold for the matrix nonlinear Schrodinger equation of any matrix size.