Bohr inequalities via proper combinations for a certain class of close-to-convex harmonic mappings

Abstract

Let H() be the class of complex-valued functions harmonic in ⊂C and each f=h+g∈ H(), where h and g are analytic. In the study of Bohr phenomenon for certain class of harmonic mappings, it is to find a constant rf∈ (0, 1) such that the inequality align* Mf(r):=r+Σn=2∞(|an|+|bn|)rn≤ d(f(0), ∂) \;for\;|z|=r≤ rf, align* where d(f(0), ∂) is the Euclidean distance between f(0) and the boundary of :=f(D) . The largest such radius rf is called the Bohr radius and the inequality Mf(r)≤ d(f(0), ∂) is called the Bohr inequality for the class H() . In this paper, we study Bohr phenomenon for the class of close-to-convex harmonic mappings establishing several inequalities. All the results are proved to be sharp.