The Bartle-Dunford-Schwartz and the Dinculeanu-Singer theorems revisited

Abstract

Let X and Y be Banach spaces and let be a compact Hausdorff space. Denote by Cp(,X) the space of p-continous X-valued functions, 1≤ p≤ ∞. For operators S∈L(C(),L(X,Y)) and U∈L(Cp(,X),Y), we establish integral representation theorems with respect to a vector measure m:→ L(X,Y**), where denotes the σ-algebra of Borel subsets of . The first theorem extends the classical Bartle-Dunford-Schwartz representation theorem. It is used to prove the second theorem, which extends the classical Dinculeanu-Singer representation theorem, also providing to it an alternative simpler proof. For the latter (and the main) result, we build the needed integration theory, relying on a new concept of the q-semivariation, 1≤ q≤ ∞, of a vector measure m:→ L(X,Y**).