Hadamard product of certain meromorphic univalent functions (Q805792)

The author deals with functions f regular and univalent in the punctured disk \(\{\) \(z|\) \(0<| z| <1\}\) of the form \[ f(z)=\frac{a_ 0}{z}+\sum^{\infty}_{n=1}a_ nz^ n\quad (a_ 0>0,\quad a_ n\geq 0). \] The Hadamard product of two such functions f, g is defined by \[ (f*g)(z)=a_ 0b_ 0/z+\sum^{\infty}_{n=1}a_ nb_ nz^ n. \] Some properties of those Hadamard products are proved.