On basic sequences in Banach spaces
Abstract
Let X be a Banach space with 
separable. If X has a shrinking basis and Y is a closed subspace of which contains X, there exists a shrinking basis 
in X with two complementary subsequences 
and 
so that ![[x_{m<sub>j</sub>}]](https://358864.dpsou.asia/plugins/generic/latexRender/cache/f1ce0d91842a11df6d8ddebf158be264.png)
is a reflexive space and ![X +[\widetilde{x_{n<sub>j</sub>}}]= Y](https://358864.dpsou.asia/plugins/generic/latexRender/cache/b5bd32e4e3f113ffcd56a0a047d15551.png)
, where we are denoting by ![[\widetilde{x_{n<sub>j</sub>}}]](https://358864.dpsou.asia/plugins/generic/latexRender/cache/f44530db2352e12c1f8e9bbda57cfbc1.png)
the weak-star closure of ![[x_{n<sub>j</sub>}]](https://358864.dpsou.asia/plugins/generic/latexRender/cache/2599d2644c7e374f98aa7b6e7d716aa4.png)
in . If 
is a sequence in X that converges to a point in 
for the weak-star topology,there is a basic sequence 
in such that ![[y_{n<sub>j</sub>}]](https://358864.dpsou.asia/plugins/generic/latexRender/cache/1ea11f01e20b017e70d9904d880c136b.png)
is a quasi-reflexive Banach space of order one. Given a Banach space Z with basis it is also proved that every basic sequence 
in Z has a subsequence extending to a basis of Z.
separable. If X has a shrinking basis and Y is a closed subspace of which contains X, there exists a shrinking basis in X with two complementary subsequences and so that is a reflexive space and , where we are denoting by the weak-star closure of in . If is a sequence in X that converges to a point in for the weak-star topology,there is a basic sequence in such that is a quasi-reflexive Banach space of order one. Given a Banach space Z with basis it is also proved that every basic sequence in Z has a subsequence extending to a basis of Z.DOI Code:
10.1285/i15900932v12p245
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