Region of variability for functions with positive real part

Abstract

For γ∈ such that |γ|<π/2 and 0≤β<1, let Pγ,β denote the class of all analytic functions P in the unit disk D with P(0)=1 and Re\, (eiγP(z))>βγ in D. For any fixed z0∈D and λ∈D, we shall determine the region of variability VP(z0,λ) for ∫0z0P(ζ)\,dζ when P ranges over the class P(λ) = \ P∈ Pγ,β :\, P'(0)=2(1-β)λ e-iγγ \. As a consequence, we present the region of variability for some subclasses of univalent functions. We also graphically illustrate the region of variability for several sets of parameters.