Optimal domain of Volterra operators in Korenblum spaces
Abstract
The aim of this article is to study the largest domain space [T,X], whenever it exists, of a given continuous linear operator T X X, where X⊂eq H(D) is a Banach space of analytic functions on the open unit disc D⊂eq C. That is, [T,X]⊂eq H(D) is the largest Banach space of analytic functions containing X to which T has a continuous, linear, X-valued extension T [T,X] X. The class of operators considered consists of generalized Volterra operators T acting in the Korenblum growth Banach spaces X:=A-γ, for γ>0. Previous studies dealt with the classical Ces\`aro operator T:=C acting in the Hardy spaces Hp, 1≤ p<∞, CR, CR1, in A-γ, ABR-R, and more recently, generalized Volterra operators T acting in X:=Hp, BDNS.
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