Add to ORKGWe describe the (finite-time) blow-up phenomenon for a non-negative solution of a porous medium equation of the form $$ u_t = Delta u^m + u^m $$ in the entire space. Here $m>1$ and the initial condition is assumed compactly supported. Blow-up takes place exactly inside a finite number of balls with same radii and exhibiting the same self-similar profile
AbstractIn this paper we establish the exact blow-up rate of the large solutions of a porous media l...
We study existence of global solutions and finite time blow-up of solutions to the Cauchy problem fo...
AbstractIn this paper a porous medium equation with a moving localized source ut=ur(Δu+af(u(x0(t),t)...
ABSTRACT. – We study the blow-up phenomenon for the porous-medium equation in RN, N 1, ut =um + um,...
In this paper, we devote to studying the blow-up phenomena for a porous medium equation under nonloc...
We study the blow-up set of a solution u(x,t) to the porous medium equation, ut = δ(um), in ω x (0,T...
This paper deals with the blow-up phenomena of classical solutions to porous medium problems, define...
Abstract We investigate the blow-up phenomena for a porous medium equation with weighted nonlocal so...
AbstractIn this paper, we investigate the positive solution of nonlinear nonlocal porous medium equa...
Mainly, this paper deals with the blow-up phenomena of solutions to porous medium problems, prescrib...
AbstractWe study the behaviour of nonnegative solutions of the reaction–diffusion equation{ut=(um)xx...
The final goal of this paper is to prove existence of local (strong) solutions to a (fully nonlinear...
We consider the porous medium equation with power-type reaction terms up on negatively curved Rieman...
In this paper, we study nonnegative and classical solutions u=u(x,t) to porous medium problems of th...
AbstractIn this paper we investigates the blow-up properties of the positive solutions to a porous m...
AbstractIn this paper we establish the exact blow-up rate of the large solutions of a porous media l...
We study existence of global solutions and finite time blow-up of solutions to the Cauchy problem fo...
AbstractIn this paper a porous medium equation with a moving localized source ut=ur(Δu+af(u(x0(t),t)...
ABSTRACT. – We study the blow-up phenomenon for the porous-medium equation in RN, N 1, ut =um + um,...
In this paper, we devote to studying the blow-up phenomena for a porous medium equation under nonloc...
We study the blow-up set of a solution u(x,t) to the porous medium equation, ut = δ(um), in ω x (0,T...
This paper deals with the blow-up phenomena of classical solutions to porous medium problems, define...
Abstract We investigate the blow-up phenomena for a porous medium equation with weighted nonlocal so...
AbstractIn this paper, we investigate the positive solution of nonlinear nonlocal porous medium equa...
Mainly, this paper deals with the blow-up phenomena of solutions to porous medium problems, prescrib...
AbstractWe study the behaviour of nonnegative solutions of the reaction–diffusion equation{ut=(um)xx...
The final goal of this paper is to prove existence of local (strong) solutions to a (fully nonlinear...
We consider the porous medium equation with power-type reaction terms up on negatively curved Rieman...
In this paper, we study nonnegative and classical solutions u=u(x,t) to porous medium problems of th...
AbstractIn this paper we investigates the blow-up properties of the positive solutions to a porous m...
AbstractIn this paper we establish the exact blow-up rate of the large solutions of a porous media l...
We study existence of global solutions and finite time blow-up of solutions to the Cauchy problem fo...
AbstractIn this paper a porous medium equation with a moving localized source ut=ur(Δu+af(u(x0(t),t)...