AbstractUsing methods from topological dynamics a dynamical characterization of the Lyapunov form for matrices is given. It is based on an analysis of the induced flows on the projective space, the Grassmannians, and the flag manifold
For L"#infinity#-families of time varying matrices centered at an unperturbed matrix, the Lyapu...
In this thesis the Lyapunov analysis, as applied to the chaotic dynamics of quasi one dimensional ha...
A complete Lyapunov function describes the qualitative behaviour of a dynamical system: the areas wh...
AbstractUsing methods from topological dynamics a dynamical characterization of the Lyapunov form fo...
In this note we consider some sets of linear extensions of dynamical systems and research regularity...
In this survey we present the interplay between topological dynamical systems theory with network fl...
Abstract—We revisit the canonical continuous-time and discrete-time matrix algebraic and matrix diff...
We consider dynamical systems on manifolds and explore the relationship between the Lyapunov and the...
International audienceThis paper discusses the application of Lyapunov theory in chaotic systems to ...
Thestability of trajectories in the phase space of a dynamical system can be characterized through L...
For a linear flow #PHI# on a vector bundle #pi# : E #-># S a spectrum can be defined in the follo...
Lyapunov exponents are well-known characteristic numbers that describe growth rates of perturbations...
Recent years have witnessed a growing interest in covariant Lyapunov vectors (CLVs) which span local...
The matrix equation SA+A*S=S*B*BS is studied, under the assumption that (A, B*) is controllable, but...
This book provides the first self-contained comprehensive exposition of the theory of dynamical syst...
For L"#infinity#-families of time varying matrices centered at an unperturbed matrix, the Lyapu...
In this thesis the Lyapunov analysis, as applied to the chaotic dynamics of quasi one dimensional ha...
A complete Lyapunov function describes the qualitative behaviour of a dynamical system: the areas wh...
AbstractUsing methods from topological dynamics a dynamical characterization of the Lyapunov form fo...
In this note we consider some sets of linear extensions of dynamical systems and research regularity...
In this survey we present the interplay between topological dynamical systems theory with network fl...
Abstract—We revisit the canonical continuous-time and discrete-time matrix algebraic and matrix diff...
We consider dynamical systems on manifolds and explore the relationship between the Lyapunov and the...
International audienceThis paper discusses the application of Lyapunov theory in chaotic systems to ...
Thestability of trajectories in the phase space of a dynamical system can be characterized through L...
For a linear flow #PHI# on a vector bundle #pi# : E #-># S a spectrum can be defined in the follo...
Lyapunov exponents are well-known characteristic numbers that describe growth rates of perturbations...
Recent years have witnessed a growing interest in covariant Lyapunov vectors (CLVs) which span local...
The matrix equation SA+A*S=S*B*BS is studied, under the assumption that (A, B*) is controllable, but...
This book provides the first self-contained comprehensive exposition of the theory of dynamical syst...
For L"#infinity#-families of time varying matrices centered at an unperturbed matrix, the Lyapu...
In this thesis the Lyapunov analysis, as applied to the chaotic dynamics of quasi one dimensional ha...
A complete Lyapunov function describes the qualitative behaviour of a dynamical system: the areas wh...
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