Iterated Aluthge transforms of some composition operators on weighted Bergman spaces

Abstract

In this paper, we compute the iterated Aluthge transforms Cφ(n) of the composition operator Cφ on the weighted Bergman spaces Aα2(D), where φ(z)=az+(1-a) for 0<a<1. Also, we obtain the norm and numerical radius of Cφ(n) on Aα2(D). We establish that Cφ(n) converges in the strong operator topology on Aα2(D). The purpose of this paper is to examine the results of jung2015iterated for the weighted Bergman spaces Aα2(D). Additionally, by using the iterated Aluthge transforms of Cφ* on Aα2(D), we derive the iterated Aluthge transforms of Cσ, where σ(z)=az-(1-a)z+1 for 0<a<1, on some weighted Hardy space H2(βα) and study its convergence. Finally, we raise some questions that emerge from these findings.