Starlikeness of a product of starlike functions with non-vanishing polynomials

Abstract

For a function f starlike of order α, 0≤slant α <1, a non-constant polynomial Q of degree n which is non-vanishing in the unit disc D and β>0, we consider the function F:D defined by F(z)=f(z) (Q(z))β /n and find the largest value of r∈ (0,1] such that r-1 F(rz) lies in various known subclasses of starlike functions such as the class of starlike functions of order λ, the classes of starlike functions associated with the exponential function, cardioid, a rational function, nephroid domain and modified sigmoid function. Our radii results are sharp. We also discuss the correlation with known radii results as special cases.