Book contents
- Frontmatter
- Dedication
- Contents
- Preface
- Acknowledgments
- 1 Introduction and Background
- 2 Mathematical Models of Fluid Flow
- 3 Numerical Methods for the Solution of Partial Differential Equations
- 4 Fundamental Stability Theory
- 5 Shock Capturing Schemes I: Scalar Conservation Laws
- 6 Shock Capturing Schemes II: Systems of Equations and Gas Dynamics
- 7 Discretization Schemes for Flows in Complex Multi-dimensional Domains
- 8 The Calculation of Viscous flow
- 9 Overview of Time Integration Methods
- 10 Steady State Problems
- 11 Time-Accurate Methods for Unsteady Flow
- 12 Energy Stability for Nonlinear Problems
- 13 High order Methods for Structured Meshes
- 14 High Order Methods for Unstructured Meshes
- 15 Aerodynamic Shape Optimization
- Appendix A Vector and Function Spaces
- Appendix B Approximation Theory
- Appendix C Polynomial Interpolation, Differentiation, and Integration
- Appendix D Potential Flow Methods
- Appendix E Fundamental Stability Theory II
- Appendix F Turbulence Models
- References
- Index
- Plates
13 - High order Methods for Structured Meshes
Published online by Cambridge University Press: 12 August 2022
Book contents
- Frontmatter
- Dedication
- Contents
- Preface
- Acknowledgments
- 1 Introduction and Background
- 2 Mathematical Models of Fluid Flow
- 3 Numerical Methods for the Solution of Partial Differential Equations
- 4 Fundamental Stability Theory
- 5 Shock Capturing Schemes I: Scalar Conservation Laws
- 6 Shock Capturing Schemes II: Systems of Equations and Gas Dynamics
- 7 Discretization Schemes for Flows in Complex Multi-dimensional Domains
- 8 The Calculation of Viscous flow
- 9 Overview of Time Integration Methods
- 10 Steady State Problems
- 11 Time-Accurate Methods for Unsteady Flow
- 12 Energy Stability for Nonlinear Problems
- 13 High order Methods for Structured Meshes
- 14 High Order Methods for Unstructured Meshes
- 15 Aerodynamic Shape Optimization
- Appendix A Vector and Function Spaces
- Appendix B Approximation Theory
- Appendix C Polynomial Interpolation, Differentiation, and Integration
- Appendix D Potential Flow Methods
- Appendix E Fundamental Stability Theory II
- Appendix F Turbulence Models
- References
- Index
- Plates
Summary
Higher order methodsmay be needed for the solution of multiscale flow problems. This chapter introduces the building blocks for higher order discretization, including compact finite differences and other methods suitable for building high resolution schemes on structured grids.
- Type
- Chapter
- Information
- Computational Aerodynamics , pp. 410 - 432Publisher: Cambridge University PressPrint publication year: 2022