Properties of β-Ces\`aro operators on α-Bloch space

Abstract

For each α > 0 , the α-Bloch space is consisting of all analytic functions f on the unit disk satisfying |z|<1 (1-|z|2)α |f'(z)| < + ∞. In this paper, we consider the following complex integral operator, namely the β-Ces\`aro operator equation Cβ(f)(z)=∫0zf(w)w(1-w)βdw equation and its generalization, acting from the α-Bloch space to itself, where f(0)=0 and β∈R. We investigate the boundedness and compactness of the β-Ces\`aro operators and their generalization. Also we calculate the essential norm and spectrum of these operators.