A finite volume unstructured multigrid method for efficient computation of unsteady incompressible viscous flows

A new second-order time-accurate fractional-step method for solving unsteady incompressible Navier-Stokes equations on hybrid unstructured grids is presented. The nonstaggered grid method, originally developed by Chow (1983, AIAA J. 21, 1525) for steady flow and further extended by Zang et al. (199

An algorithm for local re®nement of unstructured grids for computation of 3D steady viscous ¯ows is proposed. It is based on strict conventions for grid elements numbering that allows one to reduce memory requirements and to minimize the increase in the execution time for grid structure reconstructi

In this paper we develop and test an exponentially fitted finite volume method for the numerical solution of the Navier-Stokes equations describing \(2 D\) incompressible flows. The method is based on an Imsttuctured Delatmay mesh and its dhal Dischlet tessollation, comlined with a locally constant

An incompressible Navier-Stokes solver based on a cell-centre finite volume formulation for unstructured triangular meshes is developed and tested. The solution methodology makes use of pseudocompressibility, whereby the convective terms are computed using a Godunov-type second-order upwind finite v