Probability measures on path space for rectilinear damped pressureless Euler-Poisson equations
From MaRDI portal
Publication:6200741
DOI10.1016/j.jde.2023.12.031MaRDI QIDQ6200741
Renxiong Zhao, Aifang Qu, Hairong Yuan
Publication date: 20 February 2024
Published in: Journal of Differential Equations (Search for Journal in Brave)
Shocks and singularities for hyperbolic equations (35L67) Stochastic analysis applied to problems in fluid mechanics (76M35) Hyperbolic conservation laws (35L65) Set functions and measures and integrals in infinite-dimensional spaces (Wiener measure, Gaussian measure, etc.) (28C20) Existence, uniqueness, and regularity theory for compressible fluids and gas dynamics (76N10) Euler equations (35Q31) PDEs with measure (35R06)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Sticky particle dynamics with interactions
- Transport equation and Cauchy problem for BV vector fields
- Euler-Poisson systems as action-minimizing paths in the Wasserstein space
- Well posedness for pressureless Euler system with a flocking dissipation in Wasserstein space
- On the Cauchy problem of transportation equations
- Explicit construction of measure solutions of Cauchy problem for transportation equations
- Generalized characteristics and the uniqueness of entropy solutions to zero-pressure gas dynamics.
- Probabilistic interpretation of sticky particle model
- Generalized variational principles, global weak solutions and behavior with random initial data for systems of conservation laws arising in adhesion particle dynamics
- Sticky particles and the pressureless Euler equations in one spatial dimension
- Infinite horizon value functions in the Wasserstein spaces
- A global unique solvability of entropic weak solution to the one-dimensional pressureless Euler system with a flocking dissipation
- On the pressureless damped Euler–Poisson equations with quadratic confinement: Critical thresholds and large-time behavior
- One-Dimensional Pressureless Gas Systems with/without Viscosity
- A Wasserstein Approach to the One-Dimensional Sticky Particle System
- Pressureless Euler/Euler–Poisson Systems via Adhesion Dynamics and Scalar Conservation Laws
- Harmonic analysis of the de Rham complex on the sphere.
- Sticky Particles and Scalar Conservation Laws
- Probability measures on the path space and the sticky particle system
- A trajectory map for the pressureless Euler equations
- Lagrangian Coordinates for the Sticky Particle System
- A Simple Proof of Global Existence for the 1D Pressureless Gas Dynamics Equations
- Hyperbolic Conservation Laws in Continuum Physics
- Well posedness for pressureless flow
