A positive and stable L2-minimization based moment method for the Boltzmann equation of gas dynamics
From MaRDI portal
Publication:2129337
DOI10.1016/j.jcp.2021.110428OpenAlexW3088104155MaRDI QIDQ2129337
Publication date: 22 April 2022
Published in: Journal of Computational Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2009.11376
Numerical methods for partial differential equations, initial value and time-dependent initial-boundary value problems (65Mxx) Time-dependent statistical mechanics (dynamic and nonequilibrium) (82Cxx) Rarefied gas flows, Boltzmann equation in fluid mechanics (76Pxx)
Related Items (1)
Cites Work
- Unnamed Item
- Unnamed Item
- Moment closure approximations of the Boltzmann equation based on \(\varphi \)-divergences
- Locally refined discrete velocity grids for stationary rarefied flow simulations
- Adaptive change of basis in entropy-based moment closures for linear kinetic equations
- Deterministic solution of the spatially homogeneous Boltzmann equation using discontinuous Galerkin discretizations in the velocity space
- Local discrete velocity grids for deterministic rarefied flow simulations
- Conditional quadrature method of moments for kinetic equations
- Higher-order quadrature-based moment methods for kinetic equations
- A quadrature-based third-order moment method for dilute gas-particle flows
- An extension of Karmarkar's projective algorithm for convex quadratic programming
- The Boltzmann equation and its applications
- Characterstic waves and dissipation in the 13-moment-case
- Moment closure hierarchies for kinetic theories.
- The 35-moment system with the maximum-entropy closure for rarefied gas flows
- Efficient algorithms and implementations of entropy-based moment closures for rarefied gases
- Hierarchical Boltzmann simulations and model error estimation
- On stable wall boundary conditions for the Hermite discretization of the linearised Boltzmann equation
- Galerkin-Petrov approach for the Boltzmann equation
- Rarefied flow computations using nonlinear model Boltzmann equations
- Statistical error analysis for the direct simulation Monte Carlo technique
- Simultaneous-approximation-term based boundary discretization for moment equations of rarefied gas dynamics
- Gaussian process regression for maximum entropy distribution
- Entropic quadrature for moment approximations of the Boltzmann-BGK equation
- Towards physically realizable and hyperbolic moment closures for kinetic theory
- Error estimation and adaptive moment hierarchies for goal-oriented approximations of the Boltzmann equation
- A robust numerical method for the R13 equations of rarefied gas dynamics: application to lid driven cavity
- A class of asymptotic-preserving schemes for kinetic equations and related problems with stiff sources
- DISCRETE VELOCITY MODEL AND IMPLICIT SCHEME FOR THE BGK EQUATION OF RAREFIED GAS DYNAMICS
- Modeling Nonequilibrium Gas Flow Based on Moment Equations
- Positive $P_N$ Closures
- High-Order Entropy-Based Closures for Linear Transport in Slab Geometry II: A Computational Study of the Optimization Problem
- Entropy stability theory for difference approximations of nonlinear conservation laws and related time-dependent problems
- Moment Methods for the Semiconductor Boltzmann Equation on Bounded Position Domains
- Regularized 13-moment equations: shock structure calculations and comparison to Burnett models
- Inverse Problem Theory and Methods for Model Parameter Estimation
- An Entropic Fourier Method for the Boltzmann Equation
- DIRECT SIMULATION MONTE CARLO: Recent Advances and Applications
- An Interior Point Algorithm for Large-Scale Nonlinear Programming
- MAXIMUM ENTROPY FOR REDUCED MOMENT PROBLEMS
- Convergence Analysis of Grad's Hermite Expansion for Linear Kinetic Equations
- Uniformly accurate machine learning-based hydrodynamic models for kinetic equations
- A Regularized Entropy-Based Moment Method for Kinetic Equations
- Entropic approximation in kinetic theory
- Convergence Study of Moment Approximations for Boundary Value Problems of the Boltzmann-BGK Equation
- Globally Hyperbolic Regularization of Grad's Moment System
- Two‐Dimensional Bulk Microflow Simulations Based on Regularized Grad’s 13‐Moment Equations
- On the kinetic theory of rarefied gases
- Convergence of a discrete-velocity model for the Boltzmann-BGK equation
This page was built for publication: A positive and stable L2-minimization based moment method for the Boltzmann equation of gas dynamics
