Add to ORKGAbstract. Consider polynomial maps f: C → C of degree d ≥ 2, or more gen-erally polynomial maps from a finite union of copies of C to itself. In the space of suitably normalized maps of this type, the hyperbolic maps form an open set called the hyperbolic locus. The various connected compo-nents of this hyperbolic locus are called hyperbolic components, and those hyperbolic components with compact closure (or equivalently those contained in the “connectedness locus”) are called bounded hyperbolic components. It is shown that each bounded hyperbolic component is a topological cell contain-ing a unique post-critically finite map called its center point. For each degree d, the bounded hyperbolic components can be separated into finitely many d...
29 pages, 6 figures. complex dynamical systemInternational audienceIn this article, we study the hyp...
AbstractIn 1980's, Thurston established a combinatorial characterization for post-critically finite ...
In this article we will discuss combinatorial structure of the parameter plane of the family $ \math...
∗Revised version. The conjectures on page 16 were problematic, and have been corrected. The Problem ...
Hyperbolic components, in a reasonable space of polynomial or rational maps, are well understood. Bu...
Abstract. The tricorn is the connectedness locus of antiholomorphic quadratic polynomials. We invest...
Abstract. If K is a hyperbolic knot in the oriented S3, an algebraic com-ponent of its character var...
Abstract. We describe an algorithm for distinguishing hyperbolic compo-nents in the parameter space ...
AbstractIf K is a hyperbolic knot in S3, an algebraic component of its character variety containing ...
AbstractWe calculate the number of connected components in the space of the so-called M-polynomials ...
In this paper we consider families of holomorphic maps defined on subsets of the complex plane, and ...
In the moduli space of polynomial or rational maps of degree d, there exists a bifurcation measure w...
It is known that the disconnected Julia set of any polynomial map does not contain buried Julia comp...
This paper deals with Julia sets of polynomials and, more general, functions meromorphic on the comp...
We show that in normalized families of polynomial or rational maps, Misiurewicz maps (critically fin...
29 pages, 6 figures. complex dynamical systemInternational audienceIn this article, we study the hyp...
AbstractIn 1980's, Thurston established a combinatorial characterization for post-critically finite ...
In this article we will discuss combinatorial structure of the parameter plane of the family $ \math...
∗Revised version. The conjectures on page 16 were problematic, and have been corrected. The Problem ...
Hyperbolic components, in a reasonable space of polynomial or rational maps, are well understood. Bu...
Abstract. The tricorn is the connectedness locus of antiholomorphic quadratic polynomials. We invest...
Abstract. If K is a hyperbolic knot in the oriented S3, an algebraic com-ponent of its character var...
Abstract. We describe an algorithm for distinguishing hyperbolic compo-nents in the parameter space ...
AbstractIf K is a hyperbolic knot in S3, an algebraic component of its character variety containing ...
AbstractWe calculate the number of connected components in the space of the so-called M-polynomials ...
In this paper we consider families of holomorphic maps defined on subsets of the complex plane, and ...
In the moduli space of polynomial or rational maps of degree d, there exists a bifurcation measure w...
It is known that the disconnected Julia set of any polynomial map does not contain buried Julia comp...
This paper deals with Julia sets of polynomials and, more general, functions meromorphic on the comp...
We show that in normalized families of polynomial or rational maps, Misiurewicz maps (critically fin...
29 pages, 6 figures. complex dynamical systemInternational audienceIn this article, we study the hyp...
AbstractIn 1980's, Thurston established a combinatorial characterization for post-critically finite ...
In this article we will discuss combinatorial structure of the parameter plane of the family $ \math...