The nonlinear Galerkin method in computational fluid dynamics

Numerical simulations of large nonlinear dynamical systems, especially over long-time intervals, may be computationally very expensive. Model reduction methods have been used in this context for a long time, usually projecting the dynamical system onto a sub-space of its phase space. Nonlinear Galer

A boundary-domain integral method for the solution of general transport phenomena in incompressible uid motion given by the Navier-Stokes equation set is presented. Velocity-vorticity formulation of the conservation equations is employed. Di erent integral representations for conservation ÿeld funct

Incompressible two-dimensional flows such as the advection Liouville equation and the Euler equations have a large family of conservation laws related to conservation of area. We present two Eulerian numerical methods which preserve a discrete analog of area. The first is a fully discrete model base

Multiresolution analysis based on the reproducing kernel particle method (RKPM) is developed for computational ¯uid dynamics. An algorithm incorporating multiple-scale adaptive re®nement is introduced. The concept of using a wavelet solution as an error indicator is also presented. A few representat