For a dynamical system on a connected metric space X, the global attractor (when it exists) is connected provided that either the semigroup is time-continuous or X is locally connected. Moreover, there exists an example of a dynamical system on a connected metric space which admits a disconnected global attractor
A remarkable feature of dissipative partial differential equations (PDEs) is the existence of a glob...
This note is focused on a novel technique to establish the bound- edness in more regular spaces for...
This note is focused on a novel technique to establish the bound- edness in more regular spaces for...
AbstractFor a dynamical system on a connected metric spaceX, the global attractor (when it exists) i...
AbstractFor a dynamical system {St} on a metric space X, we examine the question whether the topolog...
For a dynamical system {S_t} on a metric space X, we examine the question whether the topological pr...
Given a map $\Phi$ defined on bounded subsets of the (base) metric space $X$ and with bounded sets a...
We consider a semilinear control dynamical system of the form dv/dt = Av(t)+F(v(t))+g(u)v(t),v(0) = ...
Let f be a continuous map on a locally connected metric space. If A is an attractor in the sense o...
It is shown that non-autonomous quasi-homogeneous dynamical systems admit a compact global attractor...
Abstract. By appealing to the theory of global attractors on complete metric spaces, we obtain weake...
We will study the action of a finite family, $\{ F\sb i\} \sbsp {i=1}{m},$ of contractive mappings o...
AbstractIn this paper we consider the existence of locally compact (maybe unbounded) attractors for ...
Abstract. It is shown that non-autonomous quasi-homogeneous dynamical systems admit a compact global...
Abstract. Herein I define the global attractor for the semidynamical system (H, {S(t)}t≥0), where H ...
A remarkable feature of dissipative partial differential equations (PDEs) is the existence of a glob...
This note is focused on a novel technique to establish the bound- edness in more regular spaces for...
This note is focused on a novel technique to establish the bound- edness in more regular spaces for...
AbstractFor a dynamical system on a connected metric spaceX, the global attractor (when it exists) i...
AbstractFor a dynamical system {St} on a metric space X, we examine the question whether the topolog...
For a dynamical system {S_t} on a metric space X, we examine the question whether the topological pr...
Given a map $\Phi$ defined on bounded subsets of the (base) metric space $X$ and with bounded sets a...
We consider a semilinear control dynamical system of the form dv/dt = Av(t)+F(v(t))+g(u)v(t),v(0) = ...
Let f be a continuous map on a locally connected metric space. If A is an attractor in the sense o...
It is shown that non-autonomous quasi-homogeneous dynamical systems admit a compact global attractor...
Abstract. By appealing to the theory of global attractors on complete metric spaces, we obtain weake...
We will study the action of a finite family, $\{ F\sb i\} \sbsp {i=1}{m},$ of contractive mappings o...
AbstractIn this paper we consider the existence of locally compact (maybe unbounded) attractors for ...
Abstract. It is shown that non-autonomous quasi-homogeneous dynamical systems admit a compact global...
Abstract. Herein I define the global attractor for the semidynamical system (H, {S(t)}t≥0), where H ...
A remarkable feature of dissipative partial differential equations (PDEs) is the existence of a glob...
This note is focused on a novel technique to establish the bound- edness in more regular spaces for...
This note is focused on a novel technique to establish the bound- edness in more regular spaces for...
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