Generalized Zalcman Conjecture for Starlike Mappings in Several Complex Variables
Abstract
Generalizing the Zalcman conjecture given by an2 - a2n-1 ≤ (n-1)2, Ma proposed and proved that the inequality an am-an+m-1 ≤ (n-1)(m-1), m,n ∈ N, holds for functions f(z)=z+a2z2 +a3 z3 +·s∈ S*, the class of starlike functions in the open unit disk. In this work, we extend this problem to several complex variables for m=2 and n=3, considering the class of starlike mappings defined on the unit ball in a complex Banach space and on bounded starlike circular domains in Cn.
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