Add to ORKGAbstract. We give three families of parabolic rational maps and show that every Cantor set of circles as the Julia set of a non-hyperbolic rational map must be quasisymmetrically equivalent to the Julia set of one map in these families for suitable parameters. Combine a result obtained before, we give a complete classification of the Cantor circles Julia sets in the sense of quasisymmetric equivalence. Moreover, we study the regularity of the components of the Cantor circles Julia sets and establish a sufficient and necessary condition when a component of a Cantor circles Julia set is a quasicircle. 1
There is a neat dichotomy for the Julia sets of quadratic rational maps; that is, they are either co...
AbstractLet f:C^→C^ be a subhyperbolic rational map of degree d. We construct a set of “proper” codi...
Abstract. There exist uniformly quasiregular maps f: R3 → R3 whose Julia sets are wil
Abstract. We study the geometric properties of the Julia sets of McMullen maps fλ(z) = zm +λ/zl, whe...
Abstract. Let f be a rational map whose Julia set J(f) is a Sierpiński carpet. We prove that J(f) i...
We give explicit examples of pairs of Julia sets of hyperbolic rational maps which are homeomorphic ...
Abstract. We prove that if ξ is a quasisymmetric homeomor-phism between Sierpiński carpets that are...
AbstractWe study a family of rational maps acting on the Riemann sphere with a single preperiodic cr...
A rational map f is called geometrically finite if every critical point contained in its Julia set i...
Let f be a rational function such that the multipliers of all repelling periodic points are real. We...
It is known that the disconnected Julia set of any polynomial map does not contain buried Julia comp...
In this paper we derive a Diophantine analysis for Julia sets of parabolic rational maps. We general...
In this paper we derive a Diophantine analysis for Julia sets of parabolic rational maps. We general...
For the family of complex rational maps F_λ(z)=z^n+λ/z^d, where λ is a complex parameter and n, d ≥ ...
summary:In a series of papers, Bandt and the author have given a symbolic and topological descriptio...
There is a neat dichotomy for the Julia sets of quadratic rational maps; that is, they are either co...
AbstractLet f:C^→C^ be a subhyperbolic rational map of degree d. We construct a set of “proper” codi...
Abstract. There exist uniformly quasiregular maps f: R3 → R3 whose Julia sets are wil
Abstract. We study the geometric properties of the Julia sets of McMullen maps fλ(z) = zm +λ/zl, whe...
Abstract. Let f be a rational map whose Julia set J(f) is a Sierpiński carpet. We prove that J(f) i...
We give explicit examples of pairs of Julia sets of hyperbolic rational maps which are homeomorphic ...
Abstract. We prove that if ξ is a quasisymmetric homeomor-phism between Sierpiński carpets that are...
AbstractWe study a family of rational maps acting on the Riemann sphere with a single preperiodic cr...
A rational map f is called geometrically finite if every critical point contained in its Julia set i...
Let f be a rational function such that the multipliers of all repelling periodic points are real. We...
It is known that the disconnected Julia set of any polynomial map does not contain buried Julia comp...
In this paper we derive a Diophantine analysis for Julia sets of parabolic rational maps. We general...
In this paper we derive a Diophantine analysis for Julia sets of parabolic rational maps. We general...
For the family of complex rational maps F_λ(z)=z^n+λ/z^d, where λ is a complex parameter and n, d ≥ ...
summary:In a series of papers, Bandt and the author have given a symbolic and topological descriptio...
There is a neat dichotomy for the Julia sets of quadratic rational maps; that is, they are either co...
AbstractLet f:C^→C^ be a subhyperbolic rational map of degree d. We construct a set of “proper” codi...
Abstract. There exist uniformly quasiregular maps f: R3 → R3 whose Julia sets are wil