Some exponential growth results for the pullback attractor of a reaction-diffusion when time goes to ¡1 are proved in this paper. First, a general result about Lp\H1 0 exponential growth is established. Then, under additional assumptions, an exponential growth condition in H2 for the pullback attractor of the non-autonomous reaction-diffusion equation is also deduced
In this article we study the existence and multiplicity of solutions for the Dirichlet problem $$\...
AbstractWe investigate nonlinear dynamics near an unstable constant equilibrium in the classical Kel...
AbstractThe authors analyze asymptotic behavior of the partial functional differential equations, an...
We prove some regularity results for the pullback attractor of a reaction-diffusion model. First we ...
We prove some regularity results for the pullback attractors of a non-autonomous 2D Navier–Stokes mo...
In this Note we first introduce the concept of pullback asymptotic compactness. Next, we establish a...
The existence of a pullback attractor in L2(Ω) for the following nonautonomous reaction-di usion equ...
The aim of this study is to prove global existence of classical solutions for problems of the form $...
AbstractThe existence of a pullback exponential attractor being a family of compact and positively i...
In this paper we consider a nonuniform unsrability concept for evolution operators in Banach spaces....
The existence of pullback exponential attractors for a nonautonomous semilinear parabolic equation w...
In this paper we present two methods for replacing Dirichlet\u27s problem by a sequence of Robin\u27...
AbstractIn this work, we consider an elliptic system of two equations in dimension one (with Neumann...
The aim of this study is to construct the invariant regions in which we can establish the global exi...
We give an elementary proof of weighted resolvent estimates for the semiclassical Schrödinger operat...
In this article we study the existence and multiplicity of solutions for the Dirichlet problem $$\...
AbstractWe investigate nonlinear dynamics near an unstable constant equilibrium in the classical Kel...
AbstractThe authors analyze asymptotic behavior of the partial functional differential equations, an...
We prove some regularity results for the pullback attractor of a reaction-diffusion model. First we ...
We prove some regularity results for the pullback attractors of a non-autonomous 2D Navier–Stokes mo...
In this Note we first introduce the concept of pullback asymptotic compactness. Next, we establish a...
The existence of a pullback attractor in L2(Ω) for the following nonautonomous reaction-di usion equ...
The aim of this study is to prove global existence of classical solutions for problems of the form $...
AbstractThe existence of a pullback exponential attractor being a family of compact and positively i...
In this paper we consider a nonuniform unsrability concept for evolution operators in Banach spaces....
The existence of pullback exponential attractors for a nonautonomous semilinear parabolic equation w...
In this paper we present two methods for replacing Dirichlet\u27s problem by a sequence of Robin\u27...
AbstractIn this work, we consider an elliptic system of two equations in dimension one (with Neumann...
The aim of this study is to construct the invariant regions in which we can establish the global exi...
We give an elementary proof of weighted resolvent estimates for the semiclassical Schrödinger operat...
In this article we study the existence and multiplicity of solutions for the Dirichlet problem $$\...
AbstractWe investigate nonlinear dynamics near an unstable constant equilibrium in the classical Kel...
AbstractThe authors analyze asymptotic behavior of the partial functional differential equations, an...
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