An enhanced polygonal finite-volume method for unstructured hybrid meshes

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

To date, PDF/Monte Carlo simulations, either in stand-alone codes or in hybrid finite volume/PDF Monte Carlo programs, appear to have been mostly carried out with cells of similar size. In many situations, such as capturing sharp gradients in a flow field, fine grids or unstructured solution-adaptiv

## Abstract We give here an error estimate for a finite volume discretization of the Stokes equations in two space dimensions on equilateral triangular meshes. This work was initiated by an analogous result presented by Alami‐Idrissi and Atounti for general triangular meshes. However, in this latte

This paper describes an optimization and artiÿcial intelligence-based approach for solving the mesh partitioning problem for explicit parallel dynamic ÿnite element analysis. The Sub-Domain Generation Method (SGM) (Topping, Khan, Parallel Finite Element Computations. Saxe-Coburg Publications: Edinbu