AbstractWe characterize the n-dimensional vector fields (with or without null linear parts) which can be transformed, under conjugation or orbital equivalence, into their quasi-homogeneous parts of minimum degree and, therefore, have the same dynamics. We give several examples of nilpotent and degenerate systems
AbstractA method to obtain formal symmetries of polynomial vector fields with non-null linear part i...
AbstractWe propose in this paper a method for obtaining a significant refinement of normal forms for...
We study the geometric qualitative behaviour of a class of discontinuous vector fields in four dimen...
AbstractWe characterize the n-dimensional vector fields (with or without null linear parts) which ca...
This paper uses tools in quasi-homogeneous normal form theory to discuss certain aspects of reversib...
In this paper, we study normalizationand quasi-linearization of a family of germs of hyperbolic vect...
In this paper we study C-1 linearization and classification of germs of hyperbolic vector fields on ...
Summary: The paper gives a decomposition theorem for the elements of the nonsemisimple Lie algebra ...
AbstractWe present a method for the global classification of dynamical systems based on a specific d...
Introduction, and statement of the problem The problem of linearizing a nonlinear vector field in t...
In this article, we develop some techniques to linearize families of smooth vector fields in a neigh...
AbstractWe construct and study a one-parameter family of three-dimensional vector fields Xλ near a v...
AbstractIn this paper, we consider complex smooth and analytic vector fields X in a neighborhood of ...
We study the simultaneous linearizability of d–actions (and the corresponding d-dimensional Lie alge...
We consider dynamical systems in two variables with nilpotent linearization at the origin. We show t...
AbstractA method to obtain formal symmetries of polynomial vector fields with non-null linear part i...
AbstractWe propose in this paper a method for obtaining a significant refinement of normal forms for...
We study the geometric qualitative behaviour of a class of discontinuous vector fields in four dimen...
AbstractWe characterize the n-dimensional vector fields (with or without null linear parts) which ca...
This paper uses tools in quasi-homogeneous normal form theory to discuss certain aspects of reversib...
In this paper, we study normalizationand quasi-linearization of a family of germs of hyperbolic vect...
In this paper we study C-1 linearization and classification of germs of hyperbolic vector fields on ...
Summary: The paper gives a decomposition theorem for the elements of the nonsemisimple Lie algebra ...
AbstractWe present a method for the global classification of dynamical systems based on a specific d...
Introduction, and statement of the problem The problem of linearizing a nonlinear vector field in t...
In this article, we develop some techniques to linearize families of smooth vector fields in a neigh...
AbstractWe construct and study a one-parameter family of three-dimensional vector fields Xλ near a v...
AbstractIn this paper, we consider complex smooth and analytic vector fields X in a neighborhood of ...
We study the simultaneous linearizability of d–actions (and the corresponding d-dimensional Lie alge...
We consider dynamical systems in two variables with nilpotent linearization at the origin. We show t...
AbstractA method to obtain formal symmetries of polynomial vector fields with non-null linear part i...
AbstractWe propose in this paper a method for obtaining a significant refinement of normal forms for...
We study the geometric qualitative behaviour of a class of discontinuous vector fields in four dimen...
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