Blow up and global solutions for a quasilinear riser problem

We consider a quasilinear wave equation of fourth order that models the mechanical vibrations of a marine riser. We study qualitative properties such as boundedness and blow up of solutions with respect to the norm of some Hilbert space H, for any real value of the initial energy. To this end we use

The type of problem under consideration is where D is a smooth bounded domain of R N, By constructing an auxiliary function and using Hopf's maximum principles on it, existence theorems of blow-up solutions, upper bound of "blow-up time", upper estimates of "blow-up rate", existence theorems of glo

This paper deals with a class of nonlinear parabolic problems in divergence form whose solutions, without appropriate data restrictions, might blow up at some finite time. The purpose of this paper is to establish conditions on the data sufficient to guarantee blow-up of solution at some finite time

We study the global and blow-up solutions for a strong degenerate reaction-diffusion system modeling the interactions of two biological species. The local existence and uniqueness of a classical solution are established. We further give the critical exponent for reaction and absorption terms for the