Výsledky vyhledávání - "Forn��ss, John Erik"

Dynamics of transcendental H��non maps III: Infinite entropy

Autor: Arosio, Leandro, Benini, Anna Miriam, Forn��ss, John Erik, Peters, Han

Very little is currently known about the dynamics of non-polynomial entire maps in several complex variables. The family of transcendental H��non maps offers the potential of combining ideas from transcendental dynamics in one variable, and the d

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Strong localization of invariant metrics

Autor: Forn��ss, John Erik, Nikolov, Nikolai

A quantitative version of strong localization of the Kobayashi, Azukawa and Sibony metrics, as well as of the squeezing function, near a plurisubharmonic peak boundary point of a domain in $\Bbb C^n$ is given. As an application, the behavior of these

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http://arxiv.org/abs/1911.09921

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Dynamics of transcendental H��non maps-II

Autor: Arosio, Leandro, Benini, Anna Miriam, Forn��ss, John Erik, Peters, Han

Transcendental H��non maps are the natural extensions of the well investigated complex polynomial H��non maps to the much larger class of holomorphic automorphisms. We prove here that transcendental H��non maps always have non-trivial dyn

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Introduction to complex dynamics in one dimension

Autor: Forn��ss, John Erik

These are notes from elementary lectures given in the summer of 2013 at the YMSC center at Tsinghua University in Beijing.

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http://arxiv.org/abs/1605.09562

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A global approximation result by Al Taylor and the strong openness conjecture in C^n

Autor: Forn��ss, John Erik, Wu, Jujie

We improve a global approximation result by Al Taylor in C^n for holomorphic functions in weighted Hilbert spaces. The main tools are a variation of the theorem of Hormander on weighted L^2-estimates for the dbar-equation together with the solution o

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http://arxiv.org/abs/1604.07305

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A characterization of the ball

Autor: Diederich, Klas, Forn��ss, John Erik, Wold, Erlend Forn��ss

We study bounded domains with certain smoothness conditions and the properties of their squeezing functions in order to prove that the domains are biholomorphic to the ball.

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http://arxiv.org/abs/1604.05057

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