Pseudospectral matrix element methods for flow in complex geometry

A multi-grid domain decomposition approach with the Schwarz alternating procedure has been developed for the solution of flow in complex geometries by the pseudospectral element method in primitive variable form. The approach for flow problems is first to divide the computational domain into a numbe

A computationally efficient pseudospectral method is developed for incompressible flow simulations in two-dimensional geometries involving periodicity in one direction and significant surface deformations. A pseudoconformal mapping is used to map the flow domain into a rectangle, thereby establishin

An algorithm has been developed which extends the scope of spectral methods to include solution of non-canonical channel flows arising from more complicated wall geometries. This significantly broadens the direct numerical simulation data base and its range of application, providing an accurate tool

## Abstract This paper introduces the hybrid wavelet collocation–Brinkman penalization method for solving the Navier–Stokes equations in arbitrarily complex geometries. The main advantages of the wavelet collocation method and penalization techniques are described, and a brief summary of their impl

We present a new family of algorithms for incompressible 30 Navier-Stokes equations in cylindrical geometry. A model problem of turbulent flow calculation in an infinite circular pipe \(\{(r, \varphi, z)\) : \(0 \leq r \leq R, 0 \leq \varphi<2 \pi,|z|<\infty \mid\) is considered and used for accurac