On Visser's inequality concerning coefficient estimates for a polynomial
Abstract
If P(z)=Σj=0najzj is a polynomial of degree n having no zero in |z|<1, then it was recently proved that for every p∈[0,+∞] and s=0,1,…,n-1, align* \|anz+asns\|p≤ \|z+δ0s\|p\|1+z\|p\|P\|p, align* where δ0s is the Kronecker delta. In this paper, we consider the class of polynomials having no zero in |z|<, ≥ 1 and obtain some generalizations of above inequality.
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