Blow-up of solutions of semilinear parabolic differential equations

In this paper, we study the following semilinear integro-di!erential equation of the parabolic type that arise in the theory of nuclear reactor kinetics: under homogeneous Dirichlet boundary condition, where p, q\*1. We "rst establish the local solvability of a large class of semilinear non-local e

## 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

Communicated by C. Bardos Abstract--Sufficient conditions for global nonexistence (blow up) of solutions of the initialboundary value problem for a class of second-order quasilinear parabolic equations: 0(( 0o) i=I are established. (~) 1999 Elsevier Science Ltd. All rights reserved. Keywords--Quasi

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