Blow-up and global existence for the inhomogeneous porous medium equation with reaction

Abstract

We study finite time blow-up and global existence of solutions to the Cauchy problem for the porous medium equation with a variable density (x) and a power-like reaction term. We show that for small enough initial data, if (x) 1(|x|)α|x|2 as |x| ∞, then solutions globally exist for any p>1. On the other hand, when (x)(|x|)α|x|2 as |x| ∞, if the initial datum is small enough then one has global existence of the solution for any p>m, while if the initial datum is large enough then the blow-up of the solutions occurs for any p>m. Such results generalize those established in [27] and [28], where it is supposed that (x) |x|-q for q>0 as |x| ∞.