AbstractIt is proved that whenever an isolated compact invariant set (or equilibrium point)Mis unstable for a certain valueλ0of a parameterλand stable for values ofλclose toλ0,Mundergoes a bifurcation atλ0. The setting is a locally asymptotically compact family of semidynamical systems on a metric space
Abstract. This paper will introduce the topic of dynamical systems with both discrete and continuous...
AbstractThere exists a unique local manifold invariant with respect to the dynamical system ż=F(z)(F...
In this paper, we use some properties of invariant sets of dynamical systems~[3] to set up a topolog...
AbstractIt is proved that whenever an isolated compact invariant set (or equilibrium point)Mis unsta...
A concept of total stability for continuous or discrete dynamical systems and a generalized definiti...
Topological bifurcations of minimal invariant sets for set-valued dynamical systems b
This paper concerns the bifurcation problem from equilibrium to invariant s-compact periodic sets i...
The presence of dry friction in mechanical systems induces the existence of an equilibrium set, cons...
We discuss the dependence of set-valued dynamical systems on parameters. Under mild assumptions whic...
There is a vast body of literature devoted to the study of bifurcation phenomena in autonomous syste...
We consider the problem of asymptotic convergence to invariant sets in interconnected nonlinear dyna...
Abstract. We consider the problem of asymptotic convergence to invariant sets in intercon-nected non...
The notion of B-stability was introduced and comprehensively studied in [1{3]. This notion can be ap...
AbstractIt is known that if T: X → X is completely continuous or if there exists an n0 > 0 such that...
In this work we analyze what happens when the generalized conditions given in [Balibrea et al., 200...
Abstract. This paper will introduce the topic of dynamical systems with both discrete and continuous...
AbstractThere exists a unique local manifold invariant with respect to the dynamical system ż=F(z)(F...
In this paper, we use some properties of invariant sets of dynamical systems~[3] to set up a topolog...
AbstractIt is proved that whenever an isolated compact invariant set (or equilibrium point)Mis unsta...
A concept of total stability for continuous or discrete dynamical systems and a generalized definiti...
Topological bifurcations of minimal invariant sets for set-valued dynamical systems b
This paper concerns the bifurcation problem from equilibrium to invariant s-compact periodic sets i...
The presence of dry friction in mechanical systems induces the existence of an equilibrium set, cons...
We discuss the dependence of set-valued dynamical systems on parameters. Under mild assumptions whic...
There is a vast body of literature devoted to the study of bifurcation phenomena in autonomous syste...
We consider the problem of asymptotic convergence to invariant sets in interconnected nonlinear dyna...
Abstract. We consider the problem of asymptotic convergence to invariant sets in intercon-nected non...
The notion of B-stability was introduced and comprehensively studied in [1{3]. This notion can be ap...
AbstractIt is known that if T: X → X is completely continuous or if there exists an n0 > 0 such that...
In this work we analyze what happens when the generalized conditions given in [Balibrea et al., 200...
Abstract. This paper will introduce the topic of dynamical systems with both discrete and continuous...
AbstractThere exists a unique local manifold invariant with respect to the dynamical system ż=F(z)(F...
In this paper, we use some properties of invariant sets of dynamical systems~[3] to set up a topolog...