Multiplication operators on spaces of integrable functions with respect to a vector measure

Abstract: We study continuity and other properties related to some kind of compactness of multiplication operators between different spaces of pth power integrable scalar functions with respect to a vector measure.

“…Also the weak sequential completeness of X implies that L p (m) is reflexive. On the other hand fixing f ∈ L p (m) then [5,Theorem 7] gives that the multiplication operator M Remark 29. There are many situations for which the hypotheses of the previous result are fulfilled.…”

A bilinear version of Orlicz–Pettis theorem

“…Also the weak sequential completeness of X implies that L p (m) is reflexive. On the other hand fixing f ∈ L p (m) then [5,Theorem 7] gives that the multiplication operator M Remark 29. There are many situations for which the hypotheses of the previous result are fulfilled.…”

A bilinear version of Orlicz–Pettis theorem

“…In [21], O. Delgado define the Orlicz spaces with respect to a vector measure m, L Φ (m), where φ is a Young's function; she studied some properties of these spaces in order to prove some results about the inclusion of them into the space L 1 (m). Our aim here is to continue the work done by A. Fernández et al in [7] that deals with the study of multiplication operators between spaces L p (m).…”

“…In [76], H. Takagi and K. Yokouchi studied multiplication operators between L p spaces over a σ−finite measure space, they particularly studied the continuity and the closedness of range. For multiplication operators between spaces of p−integrable functions with respect to a vector measure, the corresponding study was done by R. del Campo et al in [7,8]. Notice that the Köthe dual of a µ−Banach function space W, can be considered as a space of multiplication operator,…”

Duality in spaces of p-integrable functions with respect to a vector measure.

“…The multiplication operators between ( ) spaces have been studied recently in a series of papers for the case when is defined on a -algebra (see [31, Ch.3], [13], [14], [20] and [5]). In particular, the equality ( ) ⋅ ′ ( ) = 1 ( ) and the compactness properties of the multiplication operators are nowadays well-known in this case.…”

Vector measures on delta-rings and representation theorems of banach lattices