Length scales in solutions of a scalar reaction-diffusion equation with delay

In this article we use the monotone method for the computation of numerical solutions of a nonlinear reactiondiffusion-convection problem with time delay. Three monotone iteration processes for a suitably formulated finite-difference system of the problem are presented. It is shown that the sequence

A scalar linear differential equation with time-dependent delay ẋ The goal of our investigation is to give sufficient conditions for the existence of positive solutions as t → ∞ in the critical case in terms of inequalities on a and τ . A generalization of one known final (in a certain sense) resul

The kinetic equations for several types of models for fluid-solid heterogeneous non-catalytic reactions with diffusional limitations have a similar mathematical structure. These coupled nonlinear partial differential equations possess very few analytical solutions, and are even di5cult to solve nume

This paper is to investigate the asymptotic behavior of solutions for a time-delayed Lotka-Volterra N-species mutualism reaction-diffusion system with homogeneous Neumann boundary condition. It is shown, under a simple condition on the reaction rates, that the system has a unique bounded time-depend