AbstractFor a nonautonomous dynamics with discrete time obtained from the product of linear operators, we show that a nonuniform exponential contraction can be completely characterized in terms of what we call strict Lyapunov sequences. We note that nonuniform exponential contractions include as a very particular case the uniform exponential contractions that correspond to have a uniform asymptotic stability of the dynamics. We also obtain “inverse theorems” that give explicitly strict Lyapunov sequences for each nonuniform exponential contraction. Essentially, the Lyapunov sequences are obtained in terms of what are usually called Lyapunov norms, that is, norms with respect to which the behavior of a nonuniform exponential contraction beco...
AbstractWe consider linear equations x′=A(t)x that may exhibit stable, unstable and central behavior...
The notion of Lyapunov regularity for a dynamics with discrete time defined by a \emph{bounded} sequ...
The relation between the notions of nonuniform asymptotic stability and admissibility is considered....
AbstractWe establish the stability under perturbations of the dynamics defined by a sequence of line...
AbstractFor a linear nonautonomous dynamics with discrete time, we study the relation between nonuni...
For nonautonomous linear equations x A t x, we give a complete characterization of general nonunifor...
AbstractWe study the relation between the notions of nonuniform exponential stability and admissibil...
AbstractThe importance of Lyapunov functions is well known. In the general setting of nonautonomous ...
AbstractWe point out versions of a well-known theorem of R. Datko for nonuniform exponential contrac...
AbstractFor linear impulsive differential equations, we give a simple criterion for the existence of...
The existence of a Lyapunov function is established following a method of Yoshizawa for the uniform ...
1. Lyapunov exponents of dynamical systems 3 2. Examples of systems with nonzero exponents 6 3. Lyap...
The aim of this paper is to give characterizations in terms of Lyapunov functions for nonuniform exp...
Tempered exponential dichotomy formulates the nonuniform hyperbolicity for random dynamical systems....
AbstractFor a nonautonomous dynamics with discrete time given by a sequence of linear operators Am, ...
AbstractWe consider linear equations x′=A(t)x that may exhibit stable, unstable and central behavior...
The notion of Lyapunov regularity for a dynamics with discrete time defined by a \emph{bounded} sequ...
The relation between the notions of nonuniform asymptotic stability and admissibility is considered....
AbstractWe establish the stability under perturbations of the dynamics defined by a sequence of line...
AbstractFor a linear nonautonomous dynamics with discrete time, we study the relation between nonuni...
For nonautonomous linear equations x A t x, we give a complete characterization of general nonunifor...
AbstractWe study the relation between the notions of nonuniform exponential stability and admissibil...
AbstractThe importance of Lyapunov functions is well known. In the general setting of nonautonomous ...
AbstractWe point out versions of a well-known theorem of R. Datko for nonuniform exponential contrac...
AbstractFor linear impulsive differential equations, we give a simple criterion for the existence of...
The existence of a Lyapunov function is established following a method of Yoshizawa for the uniform ...
1. Lyapunov exponents of dynamical systems 3 2. Examples of systems with nonzero exponents 6 3. Lyap...
The aim of this paper is to give characterizations in terms of Lyapunov functions for nonuniform exp...
Tempered exponential dichotomy formulates the nonuniform hyperbolicity for random dynamical systems....
AbstractFor a nonautonomous dynamics with discrete time given by a sequence of linear operators Am, ...
AbstractWe consider linear equations x′=A(t)x that may exhibit stable, unstable and central behavior...
The notion of Lyapunov regularity for a dynamics with discrete time defined by a \emph{bounded} sequ...
The relation between the notions of nonuniform asymptotic stability and admissibility is considered....