AbstractLocal stability of periodic solutions is established by means of a Floquet theory for index-1 differential algebraic equations. Linear differential algebraic equations with periodic coefficients are considered in detail, and a natural notion of the monodromy matrix is obtained that generalizes the well-known theory for regular ordinary differential equations
This paper presents an extension of the classical theory of Floquet to provide a unified treatment o...
AbstractIn this paper, we study periodic linear systems on periodic time scales which include not on...
Our objective is to extend the well-known Floquet theory of ordinary differential equations with sin...
Local stability of periodic solutions is established by means of a corresponding Floquet-theory for ...
Local stability of periodic solutions is established by means of a corresponding Floquet-theory for ...
AbstractLocal stability of periodic solutions is established by means of a Floquet theory for index-...
One of the classical topics in the qualitative theory of differential equations is the Floquet theor...
In this paper, a rigorous method to compute Floquet normal forms of fundamental matrix solutions of ...
In this paper, a rigorous method to compute Floquet normal forms of fundamental matrix solutions of ...
AbstractThis paper deals with periodic index-2 differential algebraic equations and the question whe...
International audienceWe use a Floquet theory for quasi-periodic linear ordinary differential equati...
We prove the validity of a Floquet theory and the existence of Poincaré maps for periodic solutions ...
This paper deals with periodic index-2 differential algebraic equations and the question whether a p...
International audienceWe use a Floquet theory for quasi-periodic linear ordinary differential equati...
International audienceWe use a Floquet theory for quasi-periodic linear ordinary differential equati...
This paper presents an extension of the classical theory of Floquet to provide a unified treatment o...
AbstractIn this paper, we study periodic linear systems on periodic time scales which include not on...
Our objective is to extend the well-known Floquet theory of ordinary differential equations with sin...
Local stability of periodic solutions is established by means of a corresponding Floquet-theory for ...
Local stability of periodic solutions is established by means of a corresponding Floquet-theory for ...
AbstractLocal stability of periodic solutions is established by means of a Floquet theory for index-...
One of the classical topics in the qualitative theory of differential equations is the Floquet theor...
In this paper, a rigorous method to compute Floquet normal forms of fundamental matrix solutions of ...
In this paper, a rigorous method to compute Floquet normal forms of fundamental matrix solutions of ...
AbstractThis paper deals with periodic index-2 differential algebraic equations and the question whe...
International audienceWe use a Floquet theory for quasi-periodic linear ordinary differential equati...
We prove the validity of a Floquet theory and the existence of Poincaré maps for periodic solutions ...
This paper deals with periodic index-2 differential algebraic equations and the question whether a p...
International audienceWe use a Floquet theory for quasi-periodic linear ordinary differential equati...
International audienceWe use a Floquet theory for quasi-periodic linear ordinary differential equati...
This paper presents an extension of the classical theory of Floquet to provide a unified treatment o...
AbstractIn this paper, we study periodic linear systems on periodic time scales which include not on...
Our objective is to extend the well-known Floquet theory of ordinary differential equations with sin...
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