On the numerical stability of block structured algorithms with applications to 1-D advection-diffusion problems
From MaRDI portal
Publication:1892921
DOI10.1016/0045-7930(94)00021-PzbMath0826.76059WikidataQ127389664 ScholiaQ127389664MaRDI QIDQ1892921
Publication date: 22 November 1995
Published in: Computers and Fluids (Search for Journal in Brave)
eigenvalue analysisinitial-boundary value problemsartificial interfacesmultistage time stepping algorithm
Lua error in Module:PublicationMSCList at line 37: attempt to index local 'msc_result' (a nil value).
Related Items (4)
Stability of two-dimensional model problems for multiblock structured fluid-dynamics calculations ⋮ A normal mode stability analysis of multiblock algorithms for the solution of fluid-dynamics equations ⋮ Unstructured Cartesian refinement with sharp interface immersed boundary method for 3D unsteady incompressible flows ⋮ Multiblock hybrid grid finite volume method to solve flow in irregular geometries
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- A simple heuristic method for analyzing the effect of boundary conditions on numerical stability
- The linear stability of no-slip boundary conditions in the numerical solution of nonsteady fluid flows
- The stability of explicit Euler time-integration for certain finite difference approximations of the multi-dimensional advection-diffusion equation
- Boundary Approximations for Implicit Schemes for One-Dimensional Inviscid Equations of Gasdynamics
- Stability Theory of Difference Approximations for Mixed Initial Boundary Value Problems. II
- Stability of Difference Approximations of Dissipative Type for Mixed Initial-Boundary Value Problems.
- The stability of the Du Fort-Frankel method for the diffusion equation with boundary conditions involving space derivatives
- Stability Theory for Difference Approximations of Mixed Initial Boundary Value Problems. I
- Mesh Refinement
This page was built for publication: On the numerical stability of block structured algorithms with applications to 1-D advection-diffusion problems
