Add to ORKGIn this paper we extend a theorem of Sternberg and Bileckii. We study a vector field, or a diffeomorphism, in the vicinity of a hyperbolic fixed point. We show that if the eigenvalues of the linear part (at the fixed point) satisfy 2N-algebraic conditions (where N > 1), then there is a CN-linearization in the vicinity of this fixed point. If the fixed point is stable, then the CN-linearization theorem follows when only (N + 1)-algebraic conditions are satisfied. Examples are given which show that the first of these results is sharp. An application to celestial mechanics is included
We consider the problem of local linearization of power series defined over complete valued fields. ...
We study the saddle-node bifurcation of a partially hyperbolic fixed point in a Lipschitz family of ...
As a continuation of a previous work on linearization of class C1 of diffeomorphisms and flows in infi...
The standard proof of the Grobman--Hartman linearization theorem for a flow at a hyperbolic rest poi...
AbstractA well known theorem of Hartman-Grobman says that a C1 diffeomorphism f:Rn→Rn with a hyperbo...
In this paper we develop an explicit normal form conjugacy procedure, called an 'LMT normal form', t...
In this article, we develop some techniques to linearize families of smooth vector fields in a neigh...
Neste trabalho tem por objetivo a construção de conjugações suaves de pontos fixos hiperbólicos com ...
In this work we prove a C1-linearization result for contraction diffeomorphisms, near a fixed point,...
Abstract. In this paper we develop an explicit normal form conjugacy procedure, called an ‘LMT norma...
Abstract: In these notes, we discuss obstructions to the existence of local invariant manifolds of s...
AbstractA well known theorem of Hartman and Grobman says that aC2diffeomorphismf:Rn→Rnwith a hyperbo...
We study families of holomorphic vector fields, holomorphically depending on parameters,in a neighbo...
AbstractWe study families of holomorphic vector fields, holomorphically depending on parameters, in ...
We present a geometric proof of the Poincaré-Dulac Normalization Theorem for analytic vector fields ...
We consider the problem of local linearization of power series defined over complete valued fields. ...
We study the saddle-node bifurcation of a partially hyperbolic fixed point in a Lipschitz family of ...
As a continuation of a previous work on linearization of class C1 of diffeomorphisms and flows in infi...
The standard proof of the Grobman--Hartman linearization theorem for a flow at a hyperbolic rest poi...
AbstractA well known theorem of Hartman-Grobman says that a C1 diffeomorphism f:Rn→Rn with a hyperbo...
In this paper we develop an explicit normal form conjugacy procedure, called an 'LMT normal form', t...
In this article, we develop some techniques to linearize families of smooth vector fields in a neigh...
Neste trabalho tem por objetivo a construção de conjugações suaves de pontos fixos hiperbólicos com ...
In this work we prove a C1-linearization result for contraction diffeomorphisms, near a fixed point,...
Abstract. In this paper we develop an explicit normal form conjugacy procedure, called an ‘LMT norma...
Abstract: In these notes, we discuss obstructions to the existence of local invariant manifolds of s...
AbstractA well known theorem of Hartman and Grobman says that aC2diffeomorphismf:Rn→Rnwith a hyperbo...
We study families of holomorphic vector fields, holomorphically depending on parameters,in a neighbo...
AbstractWe study families of holomorphic vector fields, holomorphically depending on parameters, in ...
We present a geometric proof of the Poincaré-Dulac Normalization Theorem for analytic vector fields ...
We consider the problem of local linearization of power series defined over complete valued fields. ...
We study the saddle-node bifurcation of a partially hyperbolic fixed point in a Lipschitz family of ...
As a continuation of a previous work on linearization of class C1 of diffeomorphisms and flows in infi...