Application of Pythagorean means and Differential Subordination
Abstract
For 0≤α≤ 1, let Hα(x,y) be the convex weighted harmonic mean of x and y. We establish differential subordination implications of the form equation* Hα(p(z),p(z)(z)+zp'(z)(z)) h(z)⇒ p(z) h(z), equation* where ,\; are analytic functions and h is a univalent function satisfying some special properties. Further, we prove differential subordination implications involving a combination of three classical means. As an application, we generalize many existing results and obtain sufficient conditions for starlikeness and univalence.
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