Multiplier Convergent Series

Saved in:
Bibliographic Details
Title: Multiplier Convergent Series
Description: If λ is a space of scalar-valued sequences, then a series ∑j xj in a topological vector space X is λ-multiplier convergent if the series ∑j=1∞ tjxj converges in X for every {tj} ελ. This monograph studies properties of such series and gives applications to topics in locally convex spaces and vector-valued measures. A number of versions of the Orlicz-Pettis theorem are derived for multiplier convergent series with respect to various locally convex topologies. Variants of the classical Hahn-Schur theorem on the equivalence of weak and norm convergent series in ι1 are also developed for multiplier convergent series. Finally, the notion of multiplier convergent series is extended to operator-valued series and vector-valued multipliers.
Authors: Charles W Swartz
Resource Type: eBook.
Subjects: Series, Arithmetic, Orlicz spaces, Convergence, Multipliers (Mathematical analysis)
Categories: MATHEMATICS / Differential Equations / General, MATHEMATICS / Vector Analysis, MATHEMATICS / Mathematical Analysis
Database: eBook Collection (EBSCOhost)
Description
Abstract:If λ is a space of scalar-valued sequences, then a series ∑j xj in a topological vector space X is λ-multiplier convergent if the series ∑j=1∞ tjxj converges in X for every {tj} ελ. This monograph studies properties of such series and gives applications to topics in locally convex spaces and vector-valued measures. A number of versions of the Orlicz-Pettis theorem are derived for multiplier convergent series with respect to various locally convex topologies. Variants of the classical Hahn-Schur theorem on the equivalence of weak and norm convergent series in ι1 are also developed for multiplier convergent series. Finally, the notion of multiplier convergent series is extended to operator-valued series and vector-valued multipliers.
ISBN:9789812833877
9789812833884