Add to ORKGWe give sufficient conditions for a diffeomorphism in the plane to be analytically conjugate to a shift in a complex neighborhood of a segment of an invariant curve. For a family of functions close to the identity uniform estimates are established. As a consequence an exponential upper estimate for splitting of separatrices is established for diffeomorphisms of the plane close to the identity. The constant in the exponent is related to the width of the analyticity domain of the limit flow separatrix. Unlike the previous works the cases of non-area-preserving maps and parabolic fixed points are included
Preprint enviat per a la seva publicació en una revista científica: Regular & Chaotic Dynamics, 1998...
We study local analytic simplification of families of analytic maps near a hyperbolic fixed point. A...
We consider families of one and a half degrees of freedom Hamiltonians with high frequency periodic ...
In this paper we study germs of diffeomorphisms in the complex plane. We address the following probl...
The splitting of separatrices of area preserving maps close to the identity is one of the most parad...
Abstract. In this paper we consider the standard map, and we study the invariant curve obtained by a...
Theorems characterizing stable parabolic points are proved. Essentially, stability is equivalent to ...
We consider families of analytic area-preserving maps depending on two pa- rameters: the perturbatio...
Introduction A century ago, the phenomenon of the splitting of separatrices was discovered by Henri...
The splitting of separatrices of area preserving maps close to the identity is one of the most parad...
Embedding flows are used to obtain a rigidity result on strongly topological conjugacy of families o...
For diffeomorphisms on surfaces with basic sets, we show the following type of rigidity result: if a...
We present a proof of Herman’s Last Geometric Theorem asserting that if F is a smooth diffeomorphism...
We give a characterization of piecewise C1 class P homeomorphism f of the circle with irrational rot...
We consider families of analytic area-preserving maps depending on two parameters: the perturbation ...
Preprint enviat per a la seva publicació en una revista científica: Regular & Chaotic Dynamics, 1998...
We study local analytic simplification of families of analytic maps near a hyperbolic fixed point. A...
We consider families of one and a half degrees of freedom Hamiltonians with high frequency periodic ...
In this paper we study germs of diffeomorphisms in the complex plane. We address the following probl...
The splitting of separatrices of area preserving maps close to the identity is one of the most parad...
Abstract. In this paper we consider the standard map, and we study the invariant curve obtained by a...
Theorems characterizing stable parabolic points are proved. Essentially, stability is equivalent to ...
We consider families of analytic area-preserving maps depending on two pa- rameters: the perturbatio...
Introduction A century ago, the phenomenon of the splitting of separatrices was discovered by Henri...
The splitting of separatrices of area preserving maps close to the identity is one of the most parad...
Embedding flows are used to obtain a rigidity result on strongly topological conjugacy of families o...
For diffeomorphisms on surfaces with basic sets, we show the following type of rigidity result: if a...
We present a proof of Herman’s Last Geometric Theorem asserting that if F is a smooth diffeomorphism...
We give a characterization of piecewise C1 class P homeomorphism f of the circle with irrational rot...
We consider families of analytic area-preserving maps depending on two parameters: the perturbation ...
Preprint enviat per a la seva publicació en una revista científica: Regular & Chaotic Dynamics, 1998...
We study local analytic simplification of families of analytic maps near a hyperbolic fixed point. A...
We consider families of one and a half degrees of freedom Hamiltonians with high frequency periodic ...