The notion of B-stability was introduced and comprehensively studied in [1{3]. This notion can be applied to analyzing the structure of a neighborhood of a compact invariant set M of a dynamical system (X;R; ). For the case in which the phase space X is locally compact, it was shown that B-stability is an intermediate property between stability and asymptotic stability. More precisely
The theory of extensions of the dynamical equations on the torus is an important section of the theo...
The relationship between conditional and unconditional asymptotic stability properties of the null s...
This book is an introduction to main methods and principal results in the theory of Co(remark: o is ...
Let dx/dt = f(t,x) be a smooth differential equation in R×R^n and M be an s--compact invariant set ...
A general class of nonlinear systems is investigated from the stand-point of global asymptotic stabi...
This paper concerns the analysis of transferring stability properties from an invariant manifold to ...
A lot of works has been devoted to stability analysis of a stationary point for linear and non-linea...
A new definition of the stability of ordinary differential equations is proposed as an alternative t...
AbstractIt is proved that whenever an isolated compact invariant set (or equilibrium point)Mis unsta...
Theorems corresponding to the concepts of stability discussed in the works under reference should fo...
This paper concerns absolute stability (in the sense of T. Ura) for compact sets with respect to an ...
AbstractThere is presented a stability concept (para-stability) which, for compact sets, coincides w...
Abstract. In the first part of the paper some theoretical results (including the Lyapunov-Malkin the...
AbstractIt is known that if T: X → X is completely continuous or if there exists an n0 > 0 such that...
This is a graduate text in differentiable dynamical systems. It focuses on structural stability and ...
The theory of extensions of the dynamical equations on the torus is an important section of the theo...
The relationship between conditional and unconditional asymptotic stability properties of the null s...
This book is an introduction to main methods and principal results in the theory of Co(remark: o is ...
Let dx/dt = f(t,x) be a smooth differential equation in R×R^n and M be an s--compact invariant set ...
A general class of nonlinear systems is investigated from the stand-point of global asymptotic stabi...
This paper concerns the analysis of transferring stability properties from an invariant manifold to ...
A lot of works has been devoted to stability analysis of a stationary point for linear and non-linea...
A new definition of the stability of ordinary differential equations is proposed as an alternative t...
AbstractIt is proved that whenever an isolated compact invariant set (or equilibrium point)Mis unsta...
Theorems corresponding to the concepts of stability discussed in the works under reference should fo...
This paper concerns absolute stability (in the sense of T. Ura) for compact sets with respect to an ...
AbstractThere is presented a stability concept (para-stability) which, for compact sets, coincides w...
Abstract. In the first part of the paper some theoretical results (including the Lyapunov-Malkin the...
AbstractIt is known that if T: X → X is completely continuous or if there exists an n0 > 0 such that...
This is a graduate text in differentiable dynamical systems. It focuses on structural stability and ...
The theory of extensions of the dynamical equations on the torus is an important section of the theo...
The relationship between conditional and unconditional asymptotic stability properties of the null s...
This book is an introduction to main methods and principal results in the theory of Co(remark: o is ...