Add to ORKGAgraïments: The third author was supported by a Philip Leverhulme Prize.We show that an invariant Fatou component of a hyperbolic transcendental entire function is a Jordan domain (in fact, a quasidisc) if and only if it contains only finitely many critical points and no asymptotic curves. We use this theorem to prove criteria for the boundedness of Fatou components and local connectivity of Julia sets for hyperbolic entire functions, and give examples that demonstrate that our results are optimal. A particularly strong dichotomy is obtained in the case of a function with precisely two critical values
For polynomials, local connectivity of Julia sets is a much-studied and important property. Indeed, ...
We define a quasi-Fatou component of a quasiregular map as a connected component of the complement o...
For polynomials, local connectivity of Julia sets is a much-studied and important property. Indeed, ...
Abstract. We show that an invariant Fatou component of a hyperbolic transcenden-tal entire function ...
We show that an invariant Fatou component of a hyperbolic transcendental entire function is a bounde...
We show that an invariant Fatou component of a hyperbolic transcenden- tal entire function is a Jord...
Agraïments: The third author was supported by a Philip Leverhulme Prize.We show that an invariant Fa...
The paper examines some properties of the dynamics of entire functions which extend to general merom...
Let f(z) denote a transcendental entire function, F(f) and J(f) are the Fatou set and Julia set of f...
AbstractLet f be a transcendental entire function of finite order in the Eremenko–Lyubich class B (o...
We consider the iteration of quasiregular maps of transcendental type from Rd to Rd. In particular w...
This paper is concerned with the dynamics of transcendental entire functions. Let f(z) be a transcen...
Abstract. Starting with the work of I.N. Baker that appeared in 1981, many authors have studied the ...
We completely characterise the bounded sets that arise as components of the Fatou and Julia sets of ...
Agraïments: The first author is supported by Polish MNiSW Grant N N201 0234 33 and Polish MNiSW SPB-...
For polynomials, local connectivity of Julia sets is a much-studied and important property. Indeed, ...
We define a quasi-Fatou component of a quasiregular map as a connected component of the complement o...
For polynomials, local connectivity of Julia sets is a much-studied and important property. Indeed, ...
Abstract. We show that an invariant Fatou component of a hyperbolic transcenden-tal entire function ...
We show that an invariant Fatou component of a hyperbolic transcendental entire function is a bounde...
We show that an invariant Fatou component of a hyperbolic transcenden- tal entire function is a Jord...
Agraïments: The third author was supported by a Philip Leverhulme Prize.We show that an invariant Fa...
The paper examines some properties of the dynamics of entire functions which extend to general merom...
Let f(z) denote a transcendental entire function, F(f) and J(f) are the Fatou set and Julia set of f...
AbstractLet f be a transcendental entire function of finite order in the Eremenko–Lyubich class B (o...
We consider the iteration of quasiregular maps of transcendental type from Rd to Rd. In particular w...
This paper is concerned with the dynamics of transcendental entire functions. Let f(z) be a transcen...
Abstract. Starting with the work of I.N. Baker that appeared in 1981, many authors have studied the ...
We completely characterise the bounded sets that arise as components of the Fatou and Julia sets of ...
Agraïments: The first author is supported by Polish MNiSW Grant N N201 0234 33 and Polish MNiSW SPB-...
For polynomials, local connectivity of Julia sets is a much-studied and important property. Indeed, ...
We define a quasi-Fatou component of a quasiregular map as a connected component of the complement o...
For polynomials, local connectivity of Julia sets is a much-studied and important property. Indeed, ...