AbstractDifferential algebraic equations consisting of a constant coefficient linear part and a small nonlinearity are considered. Conditions that enable linearizations to work well are discussed. In particular, for index-2 differential algebraic equations, there results a kind of Perron Theorem that sounds as clear as its classical model
summary:Under suitable hypotheses on $\gamma (t)$, $\lambda (t)$, $q(t)$ we prove some stability res...
AbstractWe improve, simplify, and extend on quasi-linear case some results on asymptotical stability...
AbstractIn this paper, we discuss the global asymptotic stability of all solutions of the difference...
Differential algebraic equations consisting of a constant coefficient linear part and a small nonlin...
AbstractDifferential algebraic equations consisting of a constant coefficient linear part and a smal...
This paper considers the index-1 tractable differential-algebraic equation. The Lyapunov stability o...
We discuss the dynamics of general linear functional differential equations with solutions that exhi...
summary:In this paper, there are derived sufficient conditions for exponential and asymptotic stabil...
AbstractExistence and stability results for a class of nonlinear functional differential equations w...
AbstractWe introduce a large class of nonautonomous linear differential equations v′=A(t)v in Hilber...
summary:Sufficient conditions are established for the global stability of solutions of certain third...
This paper deals with a nonautonomous differential equation, precompact in the sense of G.R. Sell an...
This paper deals with periodic index-2 differential algebraic equations and the question whether a ...
summary:We establish the asymptotic stability of solutions of the mixed problem for the nonlinear ev...
AbstractWe perturb a linear Schrödinger equation with Lamé potential with a small positive or negati...
summary:Under suitable hypotheses on $\gamma (t)$, $\lambda (t)$, $q(t)$ we prove some stability res...
AbstractWe improve, simplify, and extend on quasi-linear case some results on asymptotical stability...
AbstractIn this paper, we discuss the global asymptotic stability of all solutions of the difference...
Differential algebraic equations consisting of a constant coefficient linear part and a small nonlin...
AbstractDifferential algebraic equations consisting of a constant coefficient linear part and a smal...
This paper considers the index-1 tractable differential-algebraic equation. The Lyapunov stability o...
We discuss the dynamics of general linear functional differential equations with solutions that exhi...
summary:In this paper, there are derived sufficient conditions for exponential and asymptotic stabil...
AbstractExistence and stability results for a class of nonlinear functional differential equations w...
AbstractWe introduce a large class of nonautonomous linear differential equations v′=A(t)v in Hilber...
summary:Sufficient conditions are established for the global stability of solutions of certain third...
This paper deals with a nonautonomous differential equation, precompact in the sense of G.R. Sell an...
This paper deals with periodic index-2 differential algebraic equations and the question whether a ...
summary:We establish the asymptotic stability of solutions of the mixed problem for the nonlinear ev...
AbstractWe perturb a linear Schrödinger equation with Lamé potential with a small positive or negati...
summary:Under suitable hypotheses on $\gamma (t)$, $\lambda (t)$, $q(t)$ we prove some stability res...
AbstractWe improve, simplify, and extend on quasi-linear case some results on asymptotical stability...
AbstractIn this paper, we discuss the global asymptotic stability of all solutions of the difference...