On Convex Dominants of Exact Differential Subordination

Abstract

Let h be a non vanishing convex univalent function and p be an analytic function in D. We consider the differential subordination i(p(z), z p'(z)) h(z) with the admissible functions in consideration as 1:=(β p(z)+γ)-α((β p(z)+γ)β(1-α)+ z p'(z)) and 2:=1γ β(βγp1-α(z))+(1-αβ p2 (1-α)(z)+γ)z p'(z)pα(z). The objective of this paper is to find the dominants, preferably the best dominant(say q) of the solution of the above differential subordination satisfying i(q, n zq'(z))= h(z). Further, we show that i(q,zq'(z))= h(z) is an exact differential equation and q is a convex univalent function in D. In addition, we estimate the sharp lower bound of p for different choices of h and derive a univalence criteria for functions in H(class of analytic normalized functions) as an application to our results.