A second order splitting algorithm for thermally‐driven flow problems
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Publication:4502401
DOI10.1108/09615539610113091zbMath0969.76566OpenAlexW2144752302MaRDI QIDQ4502401
L. J. P. Timmermans, Frans N. Van De Vosse, Peter D. Minev, Anton A. van Steenhoven
Publication date: 19 September 2001
Published in: International Journal of Numerical Methods for Heat & Fluid Flow (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1108/09615539610113091
Boussinesq approximationsplitting techniquehigh-order spectral element methoddifferentially-heated cavity
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The modeling of realistic chemical vapor infiltration/deposition reactors ⋮ A splitting technique of higher order for the Navier-Stokes equations ⋮ An algebraic factorisation scheme for spectral element solution of incompressible flow and scalar transport ⋮ Numerical simulation of two‐dimensional laminar mixed‐convection in a lid‐driven cavity using the mixed finite element consistent splitting scheme
Cites Work
- A spectral element method for fluid dynamics: Laminar flow in a channel expansion
- Laminar and turbulent natural convection in an enclosed cavity
- Boundary conditions for incompressible flows
- High-order splitting methods for the incompressible Navier-Stokes equations
- An operator-integration-factor splitting method for time-dependent problems: Application to incompressible fluid flow
- On the theory of semi-implicit projection methods for viscous incompressible flow and its implementation via a finite element method that also introduces a nearly consistent mass matrix. Part 1: Theory
- Natural convection in a square cavity: A comparison exercise
- A Taylor–Galerkin‐based algorithm for viscous incompressible flow
- Is the steady viscous incompressible two‐dimensional flow over a backward‐facing step at Re = 800 stable?
- Taylor‐Galerkin‐based spectral element methods for convection‐diffusion problems
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