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arxiv: 1908.03847 · v1 · pith:T7DGFZX3 · submitted 2019-08-11 · math-ph · math.AP· math.MP

A Rigorous Derivation of the Hamiltonian Structure for the Nonlinear Schr\"odinger Equation

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classification math-ph math.APmath.MP
keywords equationhamiltonianstructurenonlinearodingerschrsystemderivation
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We consider the cubic nonlinear Schr\"odinger equation (NLS) in any spatial dimension, which is a well-known example of an infinite-dimensional Hamiltonian system. Inspired by the knowledge that the NLS is an effective equation for a system of interacting bosons as the particle number tends to infinity, we provide a derivation of the Hamiltonian structure, which is comprised of both a Hamiltonian functional and a weak symplectic structure, for the nonlinear Schr\"odinger equation from quantum many-body systems. Our geometric constructions are based on a quantized version of the Poisson structure introduced by Marsden, Morrison and Weinstein for a system describing the evolution of finitely many indistinguishable classical particles.

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