Normal, cohyponormal and normaloid weighted composition operators on the Hardy and weighted Bergman spaces

Abstract

If is analytic on the open unit disk D and is an analytic self-map of D, the weighted composition operator C, is defined by C,f(z)=(z)f ( (z)), when f is analytic on D. In this paper, we study normal, cohyponormal, hyponormal and normaloid weighted composition operators on the Hardy and weighted Bergman spaces. First, for some weighted Hardy spaces H2(β), we prove that if C, is cohyponormal on H2(β), then never vanishes on D and is univalent, when 0 and is not a constant function. Moreover, for =Ka, where |a| < 1, we investigate normal, cohyponormal and hyponormal weighted composition operators C,. After that, for which is a hyperbolic or parabolic automorphism, we characterize all normal weighted composition operators C,, when 0 and is analytic on D. Finally, we find all normal weighted composition operators which are bounded below.