Let g and h be two transcendental entire functions. Suppose that the Fatou set F(goh) contains multiply connected components. In this article, we will consider the growth of the functions g and h.
In this paper, we discuss the rational maps Fλ(z)=z^n+λ/z^n,n≥2with the positive real parameter )λ. It is shown that the immediately attracting basin Bλ of ∞ for Fλ is always a Jordan domain if the Julia se...In this paper, we discuss the rational maps Fλ(z)=z^n+λ/z^n,n≥2with the positive real parameter )λ. It is shown that the immediately attracting basin Bλ of ∞ for Fλ is always a Jordan domain if the Julia set of Fλ is not a Cantor set. Fuhermore, Bλ is a quasidisk if there is no parabolic fixed point on the boundary of Bλ. It is also shown that if the Julia set of Fλ is connected, then it is locally connected and all Fatou components are Jordan domains. Finally, a complete description to the problem when the Julia set is a Sierpirlski curve is given.展开更多
文摘Let g and h be two transcendental entire functions. Suppose that the Fatou set F(goh) contains multiply connected components. In this article, we will consider the growth of the functions g and h.
基金Supported by National Natural Science Foundation of China (Grant Nos. 10831004, 10871047)Science and Technology Commission of Shanghai Municipality (NSF Grant 10ZR1403700)
文摘In this paper, we discuss the rational maps Fλ(z)=z^n+λ/z^n,n≥2with the positive real parameter )λ. It is shown that the immediately attracting basin Bλ of ∞ for Fλ is always a Jordan domain if the Julia set of Fλ is not a Cantor set. Fuhermore, Bλ is a quasidisk if there is no parabolic fixed point on the boundary of Bλ. It is also shown that if the Julia set of Fλ is connected, then it is locally connected and all Fatou components are Jordan domains. Finally, a complete description to the problem when the Julia set is a Sierpirlski curve is given.