Compact and order bounded sum of weighted differentiation composition operators

Abstract

In this paper, we characterize bounded, compact and order bounded sum of weighted differentiation composition operators from Bergman type spaces to weighted Banach spaces of analytic functions, where the sum of weighted differentiation composition operators is defined as Snu,τ(f)= Σj=0nDuj ,τj(f), \; \; f ∈ H( D). Here H( D) is the space of all holomorphic functions on D, u=\uj\j=0n, uj ∈ H(D), τ a holomorphic self-map of D, f(j) the jth derivative of f and weighted differentiation composition operator Duj,τj is defined as Duj,τj(f)=ujCτDj(f)=ujf(j)τ, \; \; f ∈ H( D).

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