RT Journal Article ID 05fd05c95d6ffb75 A1 Balam, Nagesh Babu A1 Gupta, Akhilesh T1 NUMERICAL SOLUTION OF NATURAL-CONVECTION FLOW IN ENCLOSURES: AN IMPLICIT VORTICITY BOUNDARY CONDITION TYPE METHOD JF Heat Transfer Research JO HTR YR 2019 FD 2019-08-21 VO 50 IS 14 SP 1383 OP 1416 K1 vorticity K1 stream function K1 implicit boundary K1 Navier-Stokes equation K1 finite difference method K1 natural convection AB This paper presents a numerical method for solving viscous incompressible Navier-Stokes equations and their application to natural-convection flow. A generalized solution methodology based on the existing vorticity-stream function methods has been developed to show that the vorticity boundary condition being implemented is explicit in nature. A novel two-dimensional numerical solution method of vorticity-stream function formulation is proposed by implementing vorticity boundary conditions implicitly. The developed method is applied to various types of two-dimensional boundaries encountered in natural-convection flows such as: a) regular (square/rectangular) boundary enclosures, b) nonrectangular/irregular boundary enclosures, c) boundary with obstructions. The results obtained match closely with standard reference results available in the literature demonstrating the second-order overall accuracy. Convergence behavior of implicit vorticity boundary conditions shows that the present method exhibits faster convergence and better stability over the conventional vorticity-stream function formulation. The present method requires solution of only one Poisson equation per each iteration time step, thus reducing the overall complexity of the algorithm equivalent to solving a heat conduction-type Poisson problem. PB Begell House LK https://www.dl.begellhouse.com/journals/46784ef93dddff27,3792b2067b513d24,05fd05c95d6ffb75.html