Bohr-Rogosinski phenomenon for S*() and C()

Abstract

In Geometric function theory, occasionally attempts have been made to solve a particular problem for the Ma-Minda classes, S*() and C() of univalent starlike and convex functions, respectively. Recently, a popular radius problem generally known as Bohr's phenomenon has been studied in various settings, however little is known about Rogosinski radius. In this article, for a fixed f∈ S*() or C(), the class of analytic subordinants Sf():= \g : g f \ is studied for the Bohr-Rogosinski phenomenon in a general setting. It's applications to the classes S*() and C() are also shown.