Weighted Composition--Differentiation Operator on the Hardy and Weighted Bergman Spaces

Abstract

In this paper, we consider the sum of weighted composition operator C_0,0 and the weighted composition--differentiation operator D_n,n,n on the Hardy and weighted Bergman spaces. We describe the spectrum of a compact operator C_0,0+D_n,n,n when the fixed point w of 0 and n is inside the open unit disk and n has a zero at w of order at least n. Also the lower estimate and the upper estimate on the norm of a weighted composition--differentiation operator on the Hardy space H2 are obtained. Furthermore, we determine the norm of a composition--differentiation operator D,n, acting on the Hardy space H2, in the case where (z)=bz for some complex number b that |b|<1.