摘要
Let C'(α,β) be the class of functions f(z) =analytic in D ={z: |z| 〈 1}, satisfying for some convex function g(z) with g(O) = g'(O) - 1 =- 0 and for allz in D the condition zf'(z)-1/g(z)/zf'(z)/g(z)+1-2α)| 〈β for some α β (0 ≤ α〈1,0 〈 β 〈 1). A sharp coefficient estimate, distortion theorems and radius of convexity are determined for the class C'(α ,β ). The results extend the work of C. Selvaraj.
Let C'(α,β) be the class of functions f(z) =analytic in D ={z: |z| 〈 1}, satisfying for some convex function g(z) with g(O) = g'(O) - 1 =- 0 and for allz in D the condition zf'(z)-1/g(z)/zf'(z)/g(z)+1-2α)| 〈β for some α β (0 ≤ α〈1,0 〈 β 〈 1). A sharp coefficient estimate, distortion theorems and radius of convexity are determined for the class C'(α ,β ). The results extend the work of C. Selvaraj.
基金
Supported partially by NSFC (10771053)
