Linear and nonlinear pattern selection in Rayleigh-Benard stability problems
Abstract
A new algorithm is introduced to compute finite-amplitude states using primitive variables for Rayleigh-Benard convection on relatively coarse meshes. The algorithm is based on a finite-difference matrix-splitting approach that separates all physical and dimensional effects into one-dimensional subsets. The nonlinear pattern selection process for steady convection in an air-filled square cavity with insulated side walls is investigated for Rayleigh numbers up to 20,000. The internalization of disturbances that evolve into coherent patterns is investigated and transient solutions from linear perturbation theory are compared with and contrasted to the full numerical simulations.
- Publication:
-
NASA STI/Recon Technical Report N
- Pub Date:
- May 1993
- Bibcode:
- 1993STIN...9435371D
- Keywords:
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- Finite Difference Theory;
- Flow Stability;
- Nonlinearity;
- Perturbation Theory;
- Rayleigh Number;
- Rayleigh-Benard Convection;
- Algorithms;
- Cavities;
- Computerized Simulation;
- Walls;
- Fluid Mechanics and Heat Transfer