Add to ORKGSemihyperbolic rational maps of the Riemann sphere form a natural class of conformal dynamical systems. The aim of the talk is to provide a topological characterization of this class based on a single numerical invariant: the Ahlfors-regular conformal dimension.Non UBCUnreviewedAuthor affiliation: Université d'Aix-MarseilleFacult
In this thesis we study the Ahlfors regular conformal dimension ($\dim_{AR}X$) of a metric space $X$...
Abstract. The dynamical degrees of a rational map f: X 99K X are fundamental invariants describing t...
For parametrized families of dynamical systems, two major goals are classifying the systems up to to...
Semihyperbolic rational maps of the Riemann sphere form a natural class of conformal dynamical syste...
International audienceThe aim of this course is to present methods coming from quasiconformal geomet...
International audienceThe aim of this course is to present methods coming from quasiconformal geomet...
International audienceThe aim of this course is to present methods coming from quasiconformal geomet...
International audienceThe aim of this course is to present methods coming from quasiconformal geomet...
This survey collect basic results concerning fractal and ergodic properties of Julia sets of rationa...
International audienceWe prove that if the Ahlfors regular conformal dimension $Q$ of a topologicall...
International audienceWe prove that if the Ahlfors regular conformal dimension $Q$ of a topologicall...
Rational maps are self-maps of the Riemann sphere of the form z → p(z)/q(z) where p(z) and q(z) are ...
Thesis (M.S.)--Wichita State University, Dept. of Mathematics and Statistics."May 2006."Includes bib...
Abstract. In this paper we discuss dimension-theoretical properties of rational maps on the Riemann ...
In previous work, a class of noninvertible topological dynamical systems $f: X \to X$ was introduced...
In this thesis we study the Ahlfors regular conformal dimension ($\dim_{AR}X$) of a metric space $X$...
Abstract. The dynamical degrees of a rational map f: X 99K X are fundamental invariants describing t...
For parametrized families of dynamical systems, two major goals are classifying the systems up to to...
Semihyperbolic rational maps of the Riemann sphere form a natural class of conformal dynamical syste...
International audienceThe aim of this course is to present methods coming from quasiconformal geomet...
International audienceThe aim of this course is to present methods coming from quasiconformal geomet...
International audienceThe aim of this course is to present methods coming from quasiconformal geomet...
International audienceThe aim of this course is to present methods coming from quasiconformal geomet...
This survey collect basic results concerning fractal and ergodic properties of Julia sets of rationa...
International audienceWe prove that if the Ahlfors regular conformal dimension $Q$ of a topologicall...
International audienceWe prove that if the Ahlfors regular conformal dimension $Q$ of a topologicall...
Rational maps are self-maps of the Riemann sphere of the form z → p(z)/q(z) where p(z) and q(z) are ...
Thesis (M.S.)--Wichita State University, Dept. of Mathematics and Statistics."May 2006."Includes bib...
Abstract. In this paper we discuss dimension-theoretical properties of rational maps on the Riemann ...
In previous work, a class of noninvertible topological dynamical systems $f: X \to X$ was introduced...
In this thesis we study the Ahlfors regular conformal dimension ($\dim_{AR}X$) of a metric space $X$...
Abstract. The dynamical degrees of a rational map f: X 99K X are fundamental invariants describing t...
For parametrized families of dynamical systems, two major goals are classifying the systems up to to...