On the Lyapunov-stability of stationary solutions of semilinear parabolic differential equations

Semilinear parabolic boundary value problems with degenerated elliptic pert where the right-hand side depends on the solution an studied. We approximate the parabolic d l l n e a r problem by a system of linear degenerate elliptic problama by the aid of wmidiraatizstion in time. Uilng weighted Sobo

In this paper we consider the question of the long time behavior of solutions of Ž . the initial value problem for evolution equations of the form durdt q Au t s Ž Ž .. F u t in a Banach space where A is the infinitesimal generator of an analytic semigroup and F is a nonlinear function such that the

## Abstract Theoretical aspects related to the approximation of the semilinear parabolic equation: $u\_t=\Delta u+f(u)$\nopagenumbers\end, with a finite unknown ‘blow‐up’ time __T__~b~ have been studied in a previous work. Specifically, for __ε__ a small positive number, we have considered coupled

The paper is concerned with the stability of the zero solution of the impulsive system method is used as a tool in obtaining the criteria for stability, asymptotic stability, and instability of the trivial solution.