Conditions for some polygonal functions to be Bazilevič

Abstract:

Univalent functions in the disc whose image is a particular eight-sided polygonal region determined by two parameters are studied. Whether such a function is Bazilevič is determined in terms of the two parameters, and the set of real $\alpha$’s is specified such that the function is $(\alpha ,\beta )$ Bazilevič for some $\beta$. For any interval $\left [ {a,b} \right ]$ where $1 < a \leqslant 3 \leqslant b$, a function of this type which is $(\alpha ,0)$ Bazilevič precisely when $\alpha$ is in this interval is found. Examples are given of non-Bazilevič functions with polygonal images and Bazilevič functions which are $(\alpha ,0)$ Bazilevič for a single value $\alpha$.