Accession Number : ADA134538


Title :   Diffusion on Viscous Fluids, Existence and Asymptotic Properties of Solutions,


Corporate Author : WISCONSIN UNIV-MADISON MATHEMATICS RESEARCH CENTER


Personal Author(s) : Beirao-da-Veiga,H


Full Text : https://apps.dtic.mil/dtic/tr/fulltext/u2/a134538.pdf


Report Date : Sep 1983


Pagination or Media Count : 21


Abstract : This document considers the motion of a mixture of two fluids, with a diffusion effect obeying Fick's law. The author considers the full non-linear problem and doesn't assume that lambda/micron is small. He proves the existence of a (unique) local solution, the existence of a global solution for small data, and the exponential decay to the equilibrium solution.


Descriptors :   *Equations of motion , *Solutions(Mixtures) , *Diffusion , *Viscosity , Fluids , Salt water , Salts , Water , Boundary value problems , Global , Asymptotic normality , Mathematical models , Nonlinear systems


Subject Categories : Numerical Mathematics
      Fluid Mechanics


Distribution Statement : APPROVED FOR PUBLIC RELEASE