Using the highly recommended numerical techniques, a finite element computer code is developed to analyse the steady incompressible, laminar and turbulent flows in 2-D domains with complex geometry. The Petrov-Galerkin finite element formulation is adopted to avoid numerical oscillations. Turbulence is modeled using the two equation k-ω model. The discretized equations are written in the form of a set of nonlinear equations by block implicit method and are then linearized by the Newton-Raphson method. The set of linearized equations are, finally, solved Through Frontal method. This generates a full implicit solution. A few laminar and turbulent flow sample problems are solved using the code. Results obtained are in perfect agreement with those obtained from numerical and experimental works reported in the literature.
M. S. Sadeghipour and R. Razmi, (1998). Turbulent Flow in 2-D Domains with Complex Geometry-Finite Elelment Method. Journal of Computational Methods in Engineering, 17(1), 109-120.
MLA
M. S. Sadeghipour and R. Razmi. "Turbulent Flow in 2-D Domains with Complex Geometry-Finite Elelment Method", Journal of Computational Methods in Engineering, 17, 1, 1998, 109-120.
HARVARD
M. S. Sadeghipour and R. Razmi, (1998). 'Turbulent Flow in 2-D Domains with Complex Geometry-Finite Elelment Method', Journal of Computational Methods in Engineering, 17(1), pp. 109-120.
VANCOUVER
M. S. Sadeghipour and R. Razmi, Turbulent Flow in 2-D Domains with Complex Geometry-Finite Elelment Method. Journal of Computational Methods in Engineering, 1998; 17(1): 109-120.