R. Armario scite author profile

Some classical Hahn-Schur Theorem-like results on the uniform convergence of unconditionally convergent series can be generalized to weakly unconditionally Cauchy series. In this paper, we obtain this type of generalization via a summability method based upon the concept of almost convergence. We also obtain a generalization of the main result in Aizpuru et al. (2003) [3] using pointwise convergence of sums indexed in natural Boolean algebras with the Vitali-Hahn-Saks Property. In order to achieve that, we first study the notion of almost convergence through its original definition (which involves Banach limits), giving a description of the extremal structure of the set of all norm-1 Hahn-Banach extensions of the limit function on c to ∞ . We also show the existence of norm-1 HahnBanach extensions of the limit function on c to ∞ that are not extensions of the almost limit function and hence are not Banach limits.

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Almost summability and unconditionally Cauchy series

Aizpuru¹,

Armario²,

Pérez-Fernández³

2008

Bull. Belg. Math. Soc. Simon Stevin

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On the Krein–Milman Property and the Bade Property

Armario

García-Pacheco

Fernández

2012

Linear Algebra and its Applications

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Vector-valued almost convergence and classical properties in normed spaces

et al. 2014

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R. Armario

On vector-valued Banach limits

Banach limits and uniform almost summability

Almost summability and unconditionally Cauchy series

On the Krein–Milman Property and the Bade Property

Vector-valued almost convergence and classical properties in normed spaces

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