Add to ORKGAbstract. Fatou components for rational functions in the Riemann sphere are very well understood and play an important role in our understanding of one-dimensional dynamics. In higher dimensions the situation is less well understood. In this work we give a classification of invariant Fatou components for moderately dissipative Hénon maps. Most of our methods apply in a much more general setting. In particular we obtain a partial classification of invariant Fatou components for holomorphic endomorphisms of projective space, and w
In this paper we study the connectivity of Fatou components for maps in a large family of singular p...
We present an optimal estimate on the Fatou coordinates that plays a key role in the study of the dy...
We present an optimal estimate on the Fatou coordinates that plays a key role in the study of the dy...
Hyperbolicity played an important role in the classification of Fatou components for rational functi...
We study invariant Fatou components for holomorphic endomorphisms in P 2 . In the recurrent case the...
We study the dynamics of a holomorphic self-map f of complexprojective space of degree d>1 by utiliz...
Treballs Finals de Grau de Matemàtiques, Facultat de Matemàtiques, Universitat de Barcelona, Any: 20...
We study the dynamics of a holomorphic self-map f of complex projective space of degree d> 1 by u...
We study the dynamics of a holomorphic self-map f of complex projective space of degree d> 1 by u...
The dynamics of transcendental functions in the complex plane has received a significant amount of a...
The dynamics of transcendental functions in the complex plane has received a significant amount of a...
The dynamics of transcendental functions in the complex plane has received a significant amount of a...
The dynamics of transcendental functions in the complex plane has received a significant amount of a...
The dynamics of transcendental functions in the complex plane has received a significant amount of a...
We construct automorphisms of ℂ2, and more precisely transcendental Hénon maps, with an invariant es...
In this paper we study the connectivity of Fatou components for maps in a large family of singular p...
We present an optimal estimate on the Fatou coordinates that plays a key role in the study of the dy...
We present an optimal estimate on the Fatou coordinates that plays a key role in the study of the dy...
Hyperbolicity played an important role in the classification of Fatou components for rational functi...
We study invariant Fatou components for holomorphic endomorphisms in P 2 . In the recurrent case the...
We study the dynamics of a holomorphic self-map f of complexprojective space of degree d>1 by utiliz...
Treballs Finals de Grau de Matemàtiques, Facultat de Matemàtiques, Universitat de Barcelona, Any: 20...
We study the dynamics of a holomorphic self-map f of complex projective space of degree d> 1 by u...
We study the dynamics of a holomorphic self-map f of complex projective space of degree d> 1 by u...
The dynamics of transcendental functions in the complex plane has received a significant amount of a...
The dynamics of transcendental functions in the complex plane has received a significant amount of a...
The dynamics of transcendental functions in the complex plane has received a significant amount of a...
The dynamics of transcendental functions in the complex plane has received a significant amount of a...
The dynamics of transcendental functions in the complex plane has received a significant amount of a...
We construct automorphisms of ℂ2, and more precisely transcendental Hénon maps, with an invariant es...
In this paper we study the connectivity of Fatou components for maps in a large family of singular p...
We present an optimal estimate on the Fatou coordinates that plays a key role in the study of the dy...
We present an optimal estimate on the Fatou coordinates that plays a key role in the study of the dy...