Title:
Weak error analysis for a nonlinear SPDE approximation of the Dean–Kawasaki equation
Author(s):
Djurdjevac, Ana; Kremp, Helena; Perkowski, Nicolas
Year of publication:
2024
Available Date:
2024-10-07T07:28:22Z
Abstract:
We consider a nonlinear SPDE approximation of the Dean–Kawasaki equation for independent particles. Our approximation satisfies the physical constraints of the particle system, i.e. its solution is a probability measure for all times (preservation of positivity and mass conservation). Using a duality argument, we prove that the weak error between particle system and nonlinear SPDE is of the order N-1-1/(d/2+1) log N. Along the way we show well-posedness, a comparison principle, and an entropy estimate for a class of nonlinear regularized Dean–Kawasaki equations with Itô noise.
Part of Identifier:
e-ISSN (online): 2194-041X
Keywords:
Dean–Kawasaki equation
Weak error analysis
Laplace duality
Nonlinear SPDE
DDC-Classification:
510 Mathematik
Publication Type:
Wissenschaftlicher Artikel
URL of the Original Publication:
DOI of the Original Publication:
Journaltitle:
Stochastics and Partial Differential Equations: Analysis and Computations
Department/institution:
Mathematik und Informatik
Institut für Mathematik
