Abstract
In this chapter, we introduce and study a subclass \({\cal N}_{p}[k,\mu,\alpha;A,B]\) of p-valent analytic functions of the type $$f(z)= z^p+ \sum ^{\infty}_{n=m}a_{n+p}z^{n+p}.$$ This class includes the class of non-Bazilevic functions. We use differential subordination to derive certain inclusion relations. Distortion theorems, radius problems, and coefficient result, are also discussed.
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