Copyright © 1987 M. K. Aouf. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.
Abstract
Let Ω denote the class of functions w(z), w(0)=0, |w(z)|<1 analytic in the unit disc ⋃={z:|z|<1}. For arbitrary fixed numbers A, B, −1<A≤1, −1≤B<1 and 0≤α<p, denote by P(A,B,p,α) the class of functions p(z)=p+∑n=1∞bnzn analytic in ⋃ such that P(z) ϵ P(A,B,p,α) if and only if P(z)=p+[pB+(A−B)(p−α)]w(z)1+Bw(z), w ϵ Ω, z ϵ ⋃. Moreover, let S(A,B,p,α) denote the class of functions f(z)=zp+∑n=p+1∞anzn analytic in ⋃ and satisfying the condition that f(z) ϵ S(A,B,p,α) if and only if zf′(z)f(z)=P(z) for some P(z) ϵ P(A,B,p,α) and all z in ⋃.
In this paper we determine the bounds for |f(z)| and |argf(z)z| in S(A,B,p,α), we investigate the coefficient estimates for functions of the class S(A,B,p,α) and we study some properties of the class S(A,B,p,α).