Analysis of Two Linearized Problems Modeling Viscous Two-Layer Flows

## Abstract The effect of wavelength and relative velocity on the disturbed interface of two‐phase stratified regime is modeled and discussed. To analyze the stability, a small perturbation is imposed on the interface. Growth or decline of the disturbed wave, relative velocity, and surface tension

## BUninlUly This paper hes two major objectives. The first is to present a two-stage leaat square8 prooedure for estimation of the parameters in a linear model whose parameters are in themselves linear functions of some hyperparemeters. The eecond, and perhaps more important point, is that the ne

## Communicated by W. Wendland We show the justi"cation of a formulation by "ctitious domain to study incompressible viscous #ows inside #uid}porous}solid systems by using the Brinkman model in a heterogeneous "ctitious porous medium covering the whole auxiliary domain. The singular perturbations

Protein fouling can significantly alter both the flux and retention characteristics of ultrafiltration membranes. There has, however, been considerable controversy over the nature of this fouling layer. In this study, hydraulic permeability and dextran sieving data were obtained both before and afte

The paper considers the non-linear stability of a non-hyperbolic system of conservation laws with both relaxation and diffusion, which is commonly used for the modeling of two-phase fluid flows. Global existence in time is proved for initial data with a sufficiently small H norm. This result heavily

The paper considers a system of partial differential equations of convection dispersion type, modelling a stratified two-phase fluid flow. Local existence in time is proved for a sufficiently smooth initial data, given in the set of physically admissible states. 1998 B. G. Teubner Stuttgart-John Wi