Boundary Asymptotic Analysis for an Incompressible Viscous Flow: Navier Wall Laws

In this paper we consider numerical simulation of incompressible viscous flow around an obstacle in velocity-pressure formulation. Two horizontal straight line artificial boundaries are introduced and the original flow is approximated by a flow in an infinite channel with slip boundary condition on

In a previous paper, we have studied the asymptotic behavior of a viscous fluid satisfying Navier's law on a periodic rugous boundary of period e and amplitude d e , with d e / e tending to zero. In the critical size, d e ∼e 3/2 , in order to obtain a strong approximation of the velocity and the pre

A Cartesian grid method has been developed for simulating two-dimensional unsteady, viscous, incompressible flows with complex immersed boundaries. A finitevolume method based on a second-order accurate central-difference scheme is used in conjunction with a two-step fractional-step procedure. The k

This paper is concerned with the asymptotic behaviors of the solutions to the initialboundary value problem for scalar viscous conservations laws ut + f(u), = uzz on [0, 11, with the boundary condition u(O,t) = u\_(t) -+ u\_, u(l,t) = u+(t) + u+, as t --t +m and the initial data u(z,O) = uo(z) satis