Hybrid finite difference fifth-order multi-resolution WENO scheme for Hamilton-Jacobi equations
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Publication:6585900
DOI10.4208/CICP.OA-2023-0002zbMATH Open1542.65094MaRDI QIDQ6585900
Z. M. Wang, Ning Zhao, Jun Zhu, Linlin Tian
Publication date: 12 August 2024
Published in: Communications in Computational Physics (Search for Journal in Brave)
Hamilton-Jacobi equationshigh order accuracyhybrid methodmulti-resolution WENO schemediscontinuity sensor
Cites Work
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- Hermite WENO schemes for Hamilton-Jacobi equations on unstructured meshes
- Numerical methods for high dimensional Hamilton-Jacobi equations using radial basis functions
- A local discontinuous Galerkin method for directly solving Hamilton-Jacobi equations
- A central discontinuous Galerkin method for Hamilton-Jacobi equations
- Reinterpretation and simplified implementation of a discontinuous Galerkin method for Hamilton-Jacobi equations
- WENO schemes with Lax-Wendroff type time discretizations for Hamilton-Jacobi equations
- A discontinuous Galerkin finite element method for directly solving the Hamilton-Jacobi equations
- Efficient, high accuracy ADER-WENO schemes for hydrodynamics and divergence-free magneto\-hydrodynamics
- Efficient implementation of essentially nonoscillatory shock-capturing schemes
- Fronts propagating with curvature-dependent speed: Algorithms based on Hamilton-Jacobi formulations
- Numerical schemes for the Hamilton-Jacobi and level set equations on triangulated domains
- On the use of Mühlbach expansions in the recovery step of ENO methods
- High order finite difference Hermite WENO schemes for the Hamilton-Jacobi equations on unstructured meshes
- A new hybrid WENO scheme for hyperbolic conservation laws
- Hermite WENO schemes for Hamilton-Jacobi equations
- Efficient implementation of weighted ENO schemes
- A new type of multi-resolution WENO schemes with increasingly higher order of accuracy
- A third-order WENO scheme based on exponential polynomials for Hamilton-Jacobi equations
- A Hermite method with a discontinuity sensor for Hamilton-Jacobi equations
- Arc length-based WENO scheme for Hamilton-Jacobi equations
- An adaptive sparse grid local discontinuous Galerkin method for Hamilton-Jacobi equations in high dimensions
- A new finite difference mapped unequal-sized WENO scheme for Hamilton-Jacobi equations
- A hybrid finite difference WENO-ZQ fast sweeping method for static Hamilton-Jacobi equations
- A new type of multi-resolution WENO schemes with increasingly higher order of accuracy on triangular meshes
- A new type of third-order finite volume multi-resolution WENO schemes on tetrahedral meshes
- An efficient fifth-order finite difference multi-resolution WENO scheme for inviscid and viscous flow problems
- Finite difference Hermite WENO schemes for the Hamilton-Jacobi equations
- Viscosity Solutions of Hamilton-Jacobi Equations
- High-Order Essentially Nonoscillatory Schemes for Hamilton–Jacobi Equations
- A Viscosity Solutions Approach to Shape-From-Shading
- High-Order WENO Schemes for Hamilton--Jacobi Equations on Triangular Meshes
- High-Order Central WENO Schemes for Multidimensional Hamilton-Jacobi Equations
- Weighted ENO Schemes for Hamilton--Jacobi Equations
- A Discontinuous Galerkin Finite Element Method for Hamilton--Jacobi Equations
- High Order Arbitrary Lagrangian-Eulerian Finite Difference WENO Scheme for Hamilton-Jacobi Equations<sup>†</sup>
- A New Type of Modified WENO Schemes for Solving Hyperbolic Conservation Laws
- A new fifth order finite difference <scp>WENO</scp> scheme for <scp>H</scp>amilton‐<scp>J</scp>acobi equations
- Central WENO Schemes for Hamilton–Jacobi Equations on Triangular Meshes
- High order numerical discretization for Hamilton-Jacobi equations on triangular meshes.
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