A rational high-order compact (RHOC) finite difference (FD) method on the nine-point stencil is proposed for solving the steady-state two-dimensional Navier-Stokes equations in the stream function-vorticity form. The resulting system of algebra equations can be solved by using the point-successive over- or under-relaxation (SOR) iteration. Numerical experiments, involving two linear and two nonlinear problems with their analytical solutions and two flow problems including the lid driven cavity and backward-facing step flows, are carried out to validate the performance of the newly proposed method. Numerical solutions of the driven cavity problem with different grid mesh sizes (maximum being 513 x 513) for Reynolds numbers ranging from 0 to 17500 are obtained and compared with some of the accurate results available in the literature.

• 出版日期2017-4-1
• 单位复旦大学; 上海交通大学