Radii of covering disks for locally univalent harmonic mappings

Abstract

For a univalent smooth mapping f of the unit disk of complex plane onto the manifold f(), let df(z0) be the radius of the largest univalent disk on the manifold f() centered at f(z0) (|z0|<1). The main aim of the present article is to investigate how the radius dh(z0) varies when the analytic function h is replaced by a sense-preserving harmonic function f=h+g. The main result includes sharp upper and lower bounds for the quotient df(z0)/dh(z0), especially, for a family of locally univalent Q-quasiconformal harmonic mappings f=h+g on |z|<1. In addition, estimate on the radius of the disk of convexity of functions belonging to certain linear invariant families of locally univalent Q-quasiconformal harmonic mappings of order α is obtained.