Miranville and S. I Math. Zelik : The infinite dimensional exponential attractor for a nonautonomous reaction-diffusion system. To appear. Fabrie, A.

### 1st Edition

Miranville : Exponential attractors for nonautonomous first-order evolution equations. Discrete Contin.

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Systems 4 , — Feireisl : Exponentially attracting finite dimensional sets for the processes generated by nonautonomous semilinear wave equations. Sell and R. Temam : Inertial manifolds for nonlinear evolution equations. Differential Equations 73 , — Ghidaglia, R.

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## Attractors for Semi-groups and Evolution Equations (Lezioni Lincee)

Cambridge University Press, Cambridge, Miranville : Exponential attractors for nonautonomous evolution equations. Miranville : Exponential attractors for a class of evolution equations by a decomposition method. The nonautonomous case. Paris Ser. Miranville : Some generalizations of the Cahn-Hilliard equation.

Asymptotic Anal. Miranville : Long time behavior of some models of Cahn-Hilliard equations in deformable continua. Nonlinear Anal. Series B 2 , — Mallet-Paret, G. Sell : Inertial manifolds for reaction-diffusion equations in higher space dimensions. Sell : Nonautonomous differential equations and topological dynamics, I, II. Shuhong : Global attractor for general nonautonomous dynamical systems.

Nonlinear World 2 , — Shuhong : Finite dimensional behavior of periodic and asymptotically periodic processes. Smiley : Global attractors and approximate inertial manifolds for nonautonomous dissipative equations. Springer-Verlag, New-York, Personalised recommendations. Cite article How to cite? ENW EndNote. Buy options. Nicolaenko and R. I Math.

Miranville and S.

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Zelik, Attractors for dissipative partial differential equations in bounded and unbounded domains, Handbook of Differential Equations: Evolutionary Equations , Handb. Download as PowerPoint slide. Pata , Sergey Zelik. A result on the existence of global attractors for semigroups of closed operators. Samir EL Mourchid. On a hypercylicity criterion for strongly continuous semigroups. Michele Coti Zelati. Global and exponential attractors for the singularly perturbed extensible beam. Filippo Dell'Oro. Global attractors for strongly damped wave equations with subcritical-critical nonlinearities.

Angela A. Albanese , Xavier Barrachina , Elisabetta M. Mangino , Alfredo Peris. Distributional chaos for strongly continuous semigroups of operators. Global and exponential attractors for a Ginzburg-Landau model of superfluidity. Pullback exponential attractors. Jin Zhang , Peter E.

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