Briot-Bouquet differential subordination and Bernardi's integral operator
Abstract
The conditions on A, B, β and γ are obtained for an analytic function p defined on the open unit disc D and normalized by p(0)=1 to be subordinate to (1+Az)/(1+Bz), -1≤ B<A ≤ 1 when p(z)+ zp'(z)/(β p(z)+γ) is subordinate to ez. The conditions on these parameters are derived for the function p to be subordinate to 1+z or ez when p(z)+ zp'(z)/(β p(z)+γ) is subordinate to (1+Az)/(1+Bz). The conditions on β and γ are determined for the function p to be subordinate to ez when p(z)+ zp'(z)/(β p(z)+γ) is subordinate to 1+z. Related result for the function p(z)+ zp'(z)/(β p(z)+γ) to be in the parabolic region bounded by the Re w=|w-1| is investigated. Sufficient conditions for the Bernardi's integral operator to belong to the various subclasses of starlike functions are obtained as applications
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