Fréchet and (LB) sequence spaces induced by dual Banach spaces of discrete Cesàro spaces
نویسندگان
چکیده
The Fréchet $(\mbox{resp.}, (\mbox{LB})\mbox{-})$ sequence spaces $ces(p+) := \bigcap_{r > p} ces(r), 1 \leq p < \infty $ (resp. ces (p\mbox{-}) \bigcup_{ r (r), \infty),$ are known to be very different the classical \ell_ {p+} (resp., \ell_{p_{\mbox{-}}}).$ Both of these classes non-normable (p+), (p\mbox{-})$ defined via family reflexive Banach (p), .$ \textit{dual}\/ d (q), q ,$ discrete Cesàro , were studied by G. Bennett, A. Jagers and others. Our aim is investigate in detail corresponding (p+) (p\mbox{-}),$ which have not been considered before. Some their properties similarities with those but, they also exhibit differences. For instance, (p+)$ isomorphic a power series Fréhet space order whereas such infinite order. Every admits an absolute basis none any basis.
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ژورنال
عنوان ژورنال: Simon Stevin
سال: 2021
ISSN: ['1370-1444', '2034-1970']
DOI: https://doi.org/10.36045/j.bbms.200203