Optimal extensions for p-th power factorable operators

Abstract

Let X(μ) be a function space related to a measure space (,,μ) with ∈ X(μ) and let T X(μ) E be a Banach space valued operator. It is known that if T is p-th power factorable then the largest function space to which T can be extended preserving p-th power factorability is given by the space Lp(mT) of p-integrable functions with respect to mT, where mT E is the vector measure associated to T via mT(A)=T(A). In this paper we extend this result by removing the restriction ∈ X(μ). In this general case, by considering mT defined on a certain δ-ring, we show that the optimal domain for T is the space Lp(mT) L1(mT). We apply the obtained results to the particular case when T is a map between sequence spaces defined by an infinite matrix.