A Fast Petrov--Galerkin Spectral Method for the Multidimensional Boltzmann Equation Using Mapped Chebyshev Functions
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Publication:5084517
DOI10.1137/21M1420721zbMath1490.35247arXiv2105.08806OpenAlexW3163401264MaRDI QIDQ5084517
Haizhao Yang, Jie Shen, Xiaodong Huang, Jingwei Hu
Publication date: 24 June 2022
Published in: SIAM Journal on Scientific Computing (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2105.08806
Spectral, collocation and related methods for initial value and initial-boundary value problems involving PDEs (65M70) Boltzmann equations (35Q20)
Related Items (2)
Moment Preserving Fourier–Galerkin Spectral Methods and Application to the Boltzmann Equation ⋮ Fourier transform approach to numerical homogenization of periodic media containing sharp insulating and superconductive cracks
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Cites Work
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- Mathematical modeling of collective behavior in socio-economic and life sciences
- Spectral-Lagrangian methods for collisional models of non-equilibrium statistical states
- The Boltzmann equation and its applications
- Galerkin-Petrov approach for the Boltzmann equation
- Regularity theory for the spatially homogeneous Boltzmann equation with cut-off
- The type 3 nonuniform FFT and its applications
- High order numerical methods for the space non-homogeneous Boltzmann equation.
- Fast deterministic method of solving the Boltzmann equation for hard spheres
- A Petrov-Galerkin spectral method for the inelastic Boltzmann equation using mapped Chebyshev functions
- A discontinuous Galerkin fast spectral method for the full Boltzmann equation with general collision kernels
- Approximations by orthonormal mapped Chebyshev functions for higher-dimensional problems in unbounded domains
- Aliasing error of the \(\exp(\beta\sqrt{1-z^2})\) kernel in the nonuniform fast Fourier transform
- On the stability of spectral methods for the homogeneous Boltzmann equation
- Analysis of spectral methods for the homogeneous Boltzmann equation
- Spectral Methods
- Shock and Boundary Structure Formation by Spectral-Lagrangian Methods for the Inhomogeneous Boltzmann Transport Equation
- A Fourier spectral method for homogeneous boltzmann equations
- Fast algorithms for computing the Boltzmann collision operator
- Hyperbolic cross approximation for the spatially homogeneous Boltzmann equation
- Quadratures on a sphere
- Numerical Solution of the Boltzmann Equation I: Spectrally Accurate Approximation of the Collision Operator
- Convergence and Error Estimates for the Lagrangian-Based Conservative Spectral Method for Boltzmann Equations
- A Polynomial Spectral Method for the Spatially Homogeneous Boltzmann Equation
- Accelerating the Nonuniform Fast Fourier Transform
- Numerical methods for kinetic equations
- Tensor-Product Discretization for the Spatially Inhomogeneous and Transient Boltzmann Equation in Two Dimensions
- Burnett Spectral Method for High-Speed Rarefied Gas Flows
- Numerical Simulation of Microflows Using Hermite Spectral Methods
- A Parallel Nonuniform Fast Fourier Transform Library Based on an “Exponential of Semicircle" Kernel
- A Fast Spectral Method for the Boltzmann Collision Operator with General Collision Kernels
- Sparse Spectral Approximations of High-Dimensional Problems Based on Hyperbolic Cross
- A New Stability and Convergence Proof of the Fourier--Galerkin Spectral Method for the Spatially Homogeneous Boltzmann Equation
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