English

On harmonic Bloch-type mappings

Complex Variables 2016-12-26 v2

Abstract

Let ff be a complex-valued harmonic mapping defined in the unit disk D\mathbb D. We introduce the following notion: we say that ff is a Bloch-type function if its Jacobian satisfies supzD(1z2)Jf(z)<. \sup_{z\in\mathbb D}(1-|z|^2)\sqrt{|J_f(z)|}<\infty. This gives rise to a new class of functions which generalizes and contains the well-known analytic Bloch space. We give estimates for the schlicht radius, the growth and the coefficients of functions in this class. We establish an analogue of the theorem which states that an analytic φ\varphi is Bloch if and only if there exists c>0c>0 and a univalent ψ\psi such that φ=clogψ\varphi = c \log \psi'.

Keywords

Cite

@article{arxiv.1607.04626,
  title  = {On harmonic Bloch-type mappings},
  author = {I. Efraimidis and J. Gaona and R. Hernández and O. Venegas},
  journal= {arXiv preprint arXiv:1607.04626},
  year   = {2016}
}

Comments

11 pages, LaTeX; corrected typos in version 2; to appear in Complex Variables and Elliptic Equations

R2 v1 2026-06-22T14:56:03.208Z