Numerical blow-up for the porous medium equation with a source

We study the Cauchy᎐Dirichlet problem for the porous media equation with nonlinear source term in a bounded subset of ‫ޒ‬ n . The problem describes the propagation of thermal perturbations in a medium with a nonlinear heat-conduction coefficient and a heat source depending on the temperature. The ai

In this paper, we establish the local existence of the solution and the finite time blow-up result for the equation where T U is the blow-up time.

This paper deals with a porous medium system with nonlocal sources and weighted nonlocal boundary conditions. The main aim of this paper is to study how the reaction terms, the diffusion terms, and the weight functions in the boundary conditions affect the global and blow-up properties to a porous m

## 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 H. A. Levine Consider the problem