A Poisson map from kinetic theory to hydrodnamics with non-constant entropy

TL;DR

This paper constructs a Poisson map linking kinetic theory and hydrodynamics, enabling Hamiltonian reduction of kinetic equations to the compressible Euler equations with non-constant entropy.

Contribution

It introduces a Poisson map from kinetic distribution functions to hydrodynamic variables, facilitating Hamiltonian reduction and derivation of fluid equations from kinetic theory.

Findings

Constructed a Poisson map respecting the Hamiltonian structure.

Derived the compressible Euler equations as an approximate Hamiltonian reduction.

Extended the framework to include non-constant entropy and Euler--Poisson equations.

Abstract

Kinetic theory describes a dilute monatomic gas using a distribution function $f(q,p,t)$, the expected phase-space density of particles. The distribution function evolves according to the collisionless Boltzmann equation in the high Knudsen number limit. Fluid dynamics is an alternative description of the gas using hydrodynamic variables that are functions of position and time only. These hydrodynamic variables evolve according to the compressible Euler equations in the inviscid limit. Both systems are noncanonical Hamiltonian systems. Each configuration space is an infinite-dimensional Poisson manifold, and the dynamics is the flow generated by a Hamiltonian functional via a Poisson bracket. We construct a map $\mathcal{J}_1$ from the space of distribution functions to the space of hydrodynamic variables that respects the Poisson brackets on the two spaces i.e. a Poisson map. It maps the $p$-integral of the Boltzmann entropy $f\log f$ to the hydrodynamic entropy density. This map belongs to a family of Poisson maps to spaces that include generalised entropy densities as additional hydrodynamic variables. The whole family can be generated from the Taylor expansion of a further Poisson map that depends on a formal parameter. If the kinetic-theory Hamiltonian factors through the Poisson map $\mathcal{J}_1$, an exact reduction of kinetic theory to fluid dynamics is possible. This is not the case, but by ignoring the relative entropy of $f$ to its local Maxwellian, we can construct an approximate Hamiltonian that factors through the map. The resulting reduced Hamiltonian generates the compressible Euler equations. We can thus derive the compressible Euler equations as a Hamiltonian approximation to kinetic theory. We also give an analogous Hamiltonian derivation of the compressible Euler--Poisson equations with non-constant entropy, starting from the Vlasov--Poisson equation.