A note on summability in Banach spaces
Abstract
Let Z and X be Banach spaces. Suppose that X is Asplund. Let M be a bounded set of operators from Z to X with the following property: a bounded sequence (zn)n∈ N in Z is weakly null if, for each M ∈ M, the sequence (M(zn))n∈ N is weakly null. Let (zn)n∈ N be a sequence in Z such that: (a) for each n∈ N, the set \M(zn):M∈ M\ is relatively norm compact; (b) for each sequence (Mn)n∈ N in M, the series Σn=1∞ Mn(zn) is weakly unconditionally Cauchy. We prove that if T∈ M is Dunford-Pettis and ∈fn∈ N\|T(zn)\|\|zn\|-1>0, then the series Σn=1∞ T(zn) is absolutely convergent. As an application, we provide another proof of the fact that a countably additive vector measure taking values in an Asplund Banach space has finite variation whenever its integration operator is Dunford-Pettis.
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