Add to ORKGTheorems characterizing stable parabolic points are proved. Essentially, stability is equivalent to the fact that the generating function of the differomorphism, taking out the part which generates the identity, has a strict extremum at the fixed point. With these results, the study of the stability of fixed points of analytic area preserving mappings (APM) is ended . Some examples are included, specially the case of elliptic points whose ei-genvalues are cubic or fourth roots of unity
It is well known that in a small neighbourhood of a parabolic fixed point a real-analytic diffeomorp...
summary:The stabilization of solutions to an abstract differential equation is investigated. The ini...
Abstract. In this paper we studyR-reversible area-preserving maps f: M →M on a two-dimensional Riema...
Theorems characterizing stable parabolic points are proved. Essentially, stability is equivalent to ...
Preprint enviat per a la seva publicació en una revista científica: Astérisque, 1982, num. 98-99, p...
KAM theorem of reversible system is used to provide a sufficient condition which guarantees the stab...
AbstractA one-parameter family of area-preserving piecewise linear maps is considered. Behavior of t...
We extend and improve the existing characterization of the dynamics of general quadratic real polyno...
Abstract. In this article, we study analyticity properties of (di-rected) areas of ε-neighborhoods o...
We present a complete theory for the stability of non-hyperbolic fixed points of one-dimensional con...
We consider the dynamics in a neighborhood of an elliptic equilibrium point with a Diophantine frequ...
We study a diffeomorphism of a multidimensional space into itself with a hyperbolic fixed point at ...
We give sufficient conditions for a diffeomorphism in the plane to be analytically conjugate to a sh...
AbstractNonlinear mappings with neutral fixed points are considered. It is assumed that the linear a...
Critical functions measure the width of the domain of stability around a given fixed point or an inv...
It is well known that in a small neighbourhood of a parabolic fixed point a real-analytic diffeomorp...
summary:The stabilization of solutions to an abstract differential equation is investigated. The ini...
Abstract. In this paper we studyR-reversible area-preserving maps f: M →M on a two-dimensional Riema...
Theorems characterizing stable parabolic points are proved. Essentially, stability is equivalent to ...
Preprint enviat per a la seva publicació en una revista científica: Astérisque, 1982, num. 98-99, p...
KAM theorem of reversible system is used to provide a sufficient condition which guarantees the stab...
AbstractA one-parameter family of area-preserving piecewise linear maps is considered. Behavior of t...
We extend and improve the existing characterization of the dynamics of general quadratic real polyno...
Abstract. In this article, we study analyticity properties of (di-rected) areas of ε-neighborhoods o...
We present a complete theory for the stability of non-hyperbolic fixed points of one-dimensional con...
We consider the dynamics in a neighborhood of an elliptic equilibrium point with a Diophantine frequ...
We study a diffeomorphism of a multidimensional space into itself with a hyperbolic fixed point at ...
We give sufficient conditions for a diffeomorphism in the plane to be analytically conjugate to a sh...
AbstractNonlinear mappings with neutral fixed points are considered. It is assumed that the linear a...
Critical functions measure the width of the domain of stability around a given fixed point or an inv...
It is well known that in a small neighbourhood of a parabolic fixed point a real-analytic diffeomorp...
summary:The stabilization of solutions to an abstract differential equation is investigated. The ini...
Abstract. In this paper we studyR-reversible area-preserving maps f: M →M on a two-dimensional Riema...