A Note on the Symplectic Structure on the Dressing Group in the sinh--Gordon Model

Abstract

We analyze the symplectic structure on the dressing group in the \, model by calculating explicitly the Poisson bracket \g g\ where g is the \, element which creates a generic one soliton solution from the vacuum. Our result is that this bracket does not coincide with the Semenov--Tian--Shansky one. The last induces a Lie--Poisson structure on the . To get the bracket obtained by us from the Semenov--Tian--Shansky bracket we apply the formalism of the constrained Hamiltonian systems. The constraints on the \, appear since the element which generates one solitons from the vacuum has a specific form.

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