Solutions of leibenson's equation with periodic boundary conditions

Solutions of the convection-diffusion equation with decay are obtained for periodic boundary conditions on a semi-infinite domain. The boundary conditions take the form of a periodic concentration or a periodic flux, and a transformation is obtained that relates the solutions of the two, pure bounda

In this paper, suitable discrete approximations for the genera2 eZliptic and parabolic partia2 differential equation with periodic boundary conditions are derived and appropriate direct and fast solution methods of the resulting linear systems proposed.

This paper is concerned with the existence and stability of periodic solutions for a coupled system of nonlinear parabolic equations under nonlinear boundary conditions. The approach to the problem is by the method of upper and lower solutions and its associated monotone iterations. This method lead

Recently much work has been devoted to periodic-parabolic equations with linear homogeneous boundary conditions. However, very little has been accomplished in the literature for periodic-parabolic problems with nonlinear boundary conditions. It is the purpose of this paper to prove existence and reg