Bohr radius for locally univalent harmonic mappings

Abstract

We consider the class of all sense-preserving harmonic mappings f= h+g of the unit disk , where h and g are analytic with g(0)=0, and determine the Bohr radius if any one of the following conditions holds: h is bounded in . h satisfies the condition Re\, h(z)≤ 1 in D with h(0)>0. both h and g are bounded in . h is bounded and g'(0)=0. We also consider the problem of determining the Bohr radius when the supremum of the modulus of the dilatation of f in is strictly less than 1. In addition, we determine the Bohr radius for the space B of analytic Bloch functions and the space BH of harmonic Bloch functions. The paper concludes with two conjectures.