On certain subclasses of close-to-convex functions related with the second-order differential subordination

Abstract

Let A be the family of analytic and normalized functions in the open unit disc |z|<1. In this article we consider the following classes equation* R(α,β):=\ f∈ A: Re\f'(z)+1+eiα2zf''(z)\>β,\, |z|<1\ equation* and equation* Lα(b):=\f∈A:|f'(z) +1+eiα2zf''(z)-b|< b,\, |z|<1 \, equation* where -π<α≤ π, 0≤ β<1 and b>1/2. We show that if f∈ R(α,β), then Re\f'(z)\ and Re\f(z)/z\ are greater than β, and if f∈Lα(b), then 0< Re\f'(z)\<2b. Also, some another interesting properties of the class Lα(b) are investigated. Finally, the radius of univalence of 2-th section sum of f∈ R(α,β) is obtained.