Localization for a doubly degenerate parabolic equation with strongly nonlinear sources

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.

We establish local existence and comparison for a model problem which incorporates the effects of non-linear diffusion, convection and reaction. The reaction term to be considered contains a non-local dependence, and we show that local solutions can be obtained via monotone limits of solutions to ap

A numerical algorithm is constructed for the solution to a class of nonlinear parabolic operators in the case of homogenization. We consider parabolic operators of the form 5 + A,, where A, is monotone. More precisely, we consider the case when d,u = -div ( a (t, sf lDulP-'Du) , where p 2 2 and k >

In this work we provide local bifurcation results for equations involving the p-Laplacian in balls. We analyze the continua C n of radial solutions emanating from (l n, p , 0), {l n, p } being the radial eigenvalues of -D p . First, we show that the only nontrivial solutions close to (l n, p , 0) li