Saved in:
Bibliographic Details
Main Author: Feng, Jin
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2512.20809
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866914217989242880
author Feng, Jin
author_facet Feng, Jin
contents We establish multi-scale convergence theory for a class of Hamilton-Jacobi PDEs in space of probability measures. They arise from context of hydrodynamic limit of N-particle deterministic action minimizing (global) Lagrangian dynamics. From a Lagrangian point of view, this can also be viewed as a limit result on two scale convergence of action minimizing probability-measure-valued paths. However, we focus on the Hamiltonian formulation here mostly. We derive and study convergence of the associated abstract but scalar Hamilton-Jacobi equations, defined in space of probability measures. There is an infinite dimensional singular averaging structure within these equations. We develop an indirect variational approach to apply finite dimensional weak K.A.M. theory to such infinite dimensional setting here. With a weakly interacting particle assumption, the averaging step only involves that of individual particles, which is implicitly but rigorously treated using the weak K.A.M. theory. Consequently, we can close the above mentioned averaging step by identifying limiting Hamiltonian, and arrive at a rigorous convergence result on solutions of the nonlinear PDEs in space of probability measures. In technical development parts of the paper, we devise new viscosity solution techniques regarding projection of equations with a submetry structure in state space, multi-scale convergence for certain abstract Hamilton-Jacobi equations in metric spaces, as well as comparison principles for equations in space of probability measures. The space of probability measure we consider is a special case of Alexandrov metric space with curvature bounded from below. Since some results are better explained in such metric space setting, we also develop some techniques in the general settings which are of independent interests.
format Preprint
id arxiv_https___arxiv_org_abs_2512_20809
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle On a Hamilton-Jacobi PDE theory for hydrodynamic limit of action minimizing collective dynamics
Feng, Jin
Analysis of PDEs
We establish multi-scale convergence theory for a class of Hamilton-Jacobi PDEs in space of probability measures. They arise from context of hydrodynamic limit of N-particle deterministic action minimizing (global) Lagrangian dynamics. From a Lagrangian point of view, this can also be viewed as a limit result on two scale convergence of action minimizing probability-measure-valued paths. However, we focus on the Hamiltonian formulation here mostly. We derive and study convergence of the associated abstract but scalar Hamilton-Jacobi equations, defined in space of probability measures. There is an infinite dimensional singular averaging structure within these equations. We develop an indirect variational approach to apply finite dimensional weak K.A.M. theory to such infinite dimensional setting here. With a weakly interacting particle assumption, the averaging step only involves that of individual particles, which is implicitly but rigorously treated using the weak K.A.M. theory. Consequently, we can close the above mentioned averaging step by identifying limiting Hamiltonian, and arrive at a rigorous convergence result on solutions of the nonlinear PDEs in space of probability measures. In technical development parts of the paper, we devise new viscosity solution techniques regarding projection of equations with a submetry structure in state space, multi-scale convergence for certain abstract Hamilton-Jacobi equations in metric spaces, as well as comparison principles for equations in space of probability measures. The space of probability measure we consider is a special case of Alexandrov metric space with curvature bounded from below. Since some results are better explained in such metric space setting, we also develop some techniques in the general settings which are of independent interests.
title On a Hamilton-Jacobi PDE theory for hydrodynamic limit of action minimizing collective dynamics
topic Analysis of PDEs
url https://arxiv.org/abs/2512.20809