Convergence to translating solutions for a class of quasilinear parabolic boundary problems

This note deals with a class of heat emission processes in a medium with a non-negative source, a nonlinear decreasing thermal conductivity and a linear radiation (Robin) boundary condition. For such heat emission problems, we make use of a first-order differential inequality technique to establish

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

The goal of this paper is to study the asymptotic behavior of the solution of the quasilinear parabolic boundary value problems defined on cylindrical domains when one or several directions go to infinity. We show that the dimension of the space can be reduced and the rate of convergence is analyzed

2 3 4 5 Then there exists a solution of (P) \* in [q; Ã \* ). Since 1 ≥ \* , Lemma 2.3(ii) implies U ( ; 1 ) ≥ U ( ; \* ) for ∈ [q; Ã \*