Convexity of the Generalized Integral Transform and Duality Techniques

Abstract

Let Wβδ(α,γ) be the class of normalized analytic functions f defined in the domain |z|<1 satisfying align* Re\, eiφ((1\!-\!α\!+\!2γ)\!(f/z)δ +(α\!-\!3γ+γ[(1-1/δ)(zf'/f)+ 1/δ(1+zf''/f')]).\\ .(f/z)δ \!(zf'/f)-β)>0, align* with the conditions α≥ 0, β<1, γ≥ 0, δ>0 and φ∈R. Moreover, for 0<δ≤1(1-ζ), 0≤ζ<1, the class Cδ(ζ) be the subclass of normalized analytic functions such that align* Re\,(1/δ(1+zf''/f')+(1-1/δ)(zf'/f))>ζ, |z|<1. align* In the present work, the sufficient conditions on λ(t) are investigated, so that the generalized integral transform align* Vλδ(f)(z)= (∫01 λ(t) (f(tz)/t)δ dt)1/δ, |z|<1, align* carries the functions from Wβδ(α,γ) into Cδ(ζ). Several interesting applications are provided for special choices of λ(t).