Global Dynamics of Blow-up Profiles in One-dimensional Reaction Diffusion Equations

## Communicated by Marek Fila We consider the blow-up of solutions for a semilinear reaction-diffusion equation with exponential reaction term. It is known that certain solutions that can be continued beyond the blow-up time possess a non-constant self-similar blowup profile. Our aim is to find th

We present a system of reaction diffusion equations posed in ‫ޒ‬ in which the diffusion terms are responsible for the finite time blow up of its solutions. ᮊ 1998

Semidiscretizations of reaction-diffusion equations are studied and special attention is devoted to symmetric solutions. Also nonsymmetric solutions are considered when the reaction term is such that f(0) = 0. Sufficient conditions for blow-up in such discretizations are established and upper bounds

## Abstract The validity for finite‐difference electrochemical kinetic simulations, of the extension of the Numerov discretization designed by Chawla and Katti [J Comput Appl Math 1980, 6, 189–196] for the solution of two‐point boundary value problems in ordinary differential equations, is examined