On certain classes of harmonic functions defined by the fractional derivatives

Abstract

In this paper we have introduced two new classes HM(β, λ, k, ) and HM (β, λ, k, ) of complex valued harmonic multivalent functions of the form f = h + g, satisfying the condition \[ Re \(1 - λ) vfz + λ(1-k) (vf)'z' + λ k (vf)''z'' \ > β, (z∈ D)\] where h and g are analytic in the unit disk D = \z : |z| < 1\. A sufficient coefficient condition for this function in the class HM(β, λ, k, ) and a necessary and sufficient coefficient condition for the function f in the class HM(β, λ, k, ) are determined. We investigate inclusion relations, distortion theorem, extreme points, convex combination and other interesting properties for these families of harmonic functions.