Sufficient Conditions and Radius Problems for a starlike Class Involving a Differential Inequality

Abstract

Let An be the class of analytic functions f(z) of the form f(z)=z+Σk=n+1∞ akzk,n∈N and let align* n:=\f∈An:|zf'(z)-f(z)|<12,\; z∈D\. align* We make use of differential subordination technique to obtain sufficient conditions for the class n, and then employ these conditions to construct functions which involve double integrals and members of n. We also consider a subclass n⊂n and obtain subordination results for members of n besides a necessary and sufficient condition. Writing 1=, we obtain inclusion properties of with respect to functions defined on certain parabolic regions and as a consequence, establish a relation connecting the parabolic starlike class Sp and the uniformly starlike UST. Various radius problems for the class are considered and the sharpness of the radii estimates is obtained analytically besides graphical illustrations.