A LEAST-SQUARES FINITE-ELEMENT METHOD FOR TIME-DEPENDENT INCOMPRESSIBLE FLOWS WITH THERMAL-CONVECTION

被引：47

作者：

TANG, LQ

TSANG, TTH

机构：

[1] Department of Chemical Engineering, University of Kentucky, Lexington, Kentucky

来源：

INTERNATIONAL JOURNAL FOR NUMERICAL METHODS IN FLUIDS | 1993年 / 17卷 / 04期

关键词：

LEAST-SQUARES FINITE ELEMENT METHOD; TIME-DEPENDENT; INCOMPRESSIBLE FLOWS; BOUSSINESQ APPROXIMATION; NAVIER-STOKES EQUATIONS;

D O I：

10.1002/fld.1650170402

中图分类号：

TP39 [计算机的应用];

学科分类号：

081203 ; 0835 ;

摘要：

The time-dependent Navier-Stokes equations and the energy balance equation for an incompressible, constant property fluid in the Boussinesq approximation are solved by a least-squares finite element method based on a velocity-pressure-vorticity-temperature-heat-flux (u-P-omega-T-q) formulation discretized by backward finite differencing in time. The discretization scheme leads to the minimization of the residual in the l2-norm for each time step. Isoparametric bilinear quadrilateral elements and reduced integration are employed. Three examples, thermally driven cavity flow at Rayleigh numbers up to 10(6), lid-driven cavity flow at Reynolds numbers up to 10(4) and flow over a square obstacle at Reynolds number 200, are presented to validate the method.

引用

页码：271 / 289

页数：19

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