Add to ORKGTwo tracking properties for trajectories on attracting sets are studied. We prove that trajectories on the full phase space can be followed arbitrarily closely by skipping from one solution on the global attractor to another. A sufficient condition for asymptotic completeness of invariant exponential attractors is found, obtaining similar results as in the theory of inertial manifolds. Furthermore, such sets are shown to be retracts of the phase space, which implies that they are simply connected.Ministerio de Educación y CienciaDepartamento de Ecuaciones Diferenciales y Análisis Numérico (Universidad de Sevilla
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We consider a dynamical system described by a system of ordinary differential equations which posses...
In this paper we present an abstract approach to inertial manifolds for nonau-tonomous dynamical sys...
AbstractIn a previous work, we established the existence of finite dimensional attractors for partly...
The theory of random attracting sets highlights interesting properties of the asymptotic behaviour o...
AbstractIn order to show that the standard partially dissipative Hodgkin–Huxley system approximates ...
This paper is devoted to the quantitative study of the attractive velocity of generalized attractors...
Abstract. We suggest in this article a new explicit algorithm allowing to construct exponential attr...
In [Adv. Math., 267(2014), 277-306], Cheskidov and Lu develop a new framework of the evolutionary sy...
We construct exponential pullback attractors for time continuous asymptotically compact evolution pr...
AbstractThis paper is devoted to the asymptotic behavior for some evolution equations when the under...
AbstractThe method of ℓ-trajectories is presented in a general setting as an alternative approach to...
Hunt and Kaloshin (1999) proved that it is possible to embed a compact subset X of a Hilbert space ...
In this paper we determine the exact structure of the pullback attractors in non-autonomous problem...
AbstractLet F be a general dynamical system defined on a complete locally compact metric space X. We...
The concept of nonautonomous (or cocycle) attractor has become a proper tool for the study of the as...
We consider a dynamical system described by a system of ordinary differential equations which posses...
In this paper we present an abstract approach to inertial manifolds for nonau-tonomous dynamical sys...
AbstractIn a previous work, we established the existence of finite dimensional attractors for partly...