Forum of Mathematics, Sigma (Jan 2023)

A rigorous derivation of the Hamiltonian structure for the Vlasov equation

  • Joseph K. Miller,
  • Andrea R. Nahmod,
  • Nataša Pavlović,
  • Matthew Rosenzweig,
  • Gigliola Staffilani

DOI
https://doi.org/10.1017/fms.2023.72
Journal volume & issue
Vol. 11

Abstract

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We consider the Vlasov equation in any spatial dimension, which has long been known [ZI76, Mor80, Gib81, MW82] to be an infinite-dimensional Hamiltonian system whose bracket structure is of Lie–Poisson type. In parallel, it is classical that the Vlasov equation is a mean-field limit for a pairwise interacting Newtonian system. Motivated by this knowledge, we provide a rigorous derivation of the Hamiltonian structure of the Vlasov equation, both the Hamiltonian functional and Poisson bracket, directly from the many-body problem. One may view this work as a classical counterpart to [MNP+20], which provided a rigorous derivation of the Hamiltonian structure of the cubic nonlinear Schrödinger equation from the many-body problem for interacting bosons in a certain infinite particle number limit, the first result of its kind. In particular, our work settles a question of Marsden, Morrison and Weinstein [MMW84] on providing a ‘statistical basis’ for the bracket structure of the Vlasov equation.

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