Time-marching schemes for spatially high order accurate discretizations of the Euler and Navier–Stokes equations
- 10 January 2022
- journal article
- review article
- Published by Elsevier BV in Progress in Aerospace Sciences
- Vol. 130, 100795
- https://doi.org/10.1016/j.paerosci.2021.100795
Abstract
No abstract availableKeywords
This publication has 120 references indexed in Scilit:
- Generalized characteristic relaxation boundary conditions for unsteady compressible flow simulationsJournal of Computational Physics, 2013
- A low-dispersion and low-dissipation implicit Runge–Kutta schemeJournal of Computational Physics, 2013
- Detached-Eddy SimulationAnnual Review of Fluid Mechanics, 2009
- Strong stability of singly-diagonally-implicit Runge–Kutta methodsApplied Numerical Mathematics, 2008
- LARGE-EDDY SIMULATION OF TURBULENT COMBUSTIONAnnual Review of Fluid Mechanics, 2006
- Parallel, adaptive finite element methods for conservation lawsApplied Numerical Mathematics, 1994
- Order stars and stability theoremsBIT Numerical Mathematics, 1978
- A stability property of implicit Runge-Kutta methodsBIT Numerical Mathematics, 1975
- High order a-stable methods for the numerical solution of systems of D.E.'sBIT Numerical Mathematics, 1968
- A special stability problem for linear multistep methodsBIT Numerical Mathematics, 1963