The main topic of this thesis is separation of points and w∗ -derived sets in dual Banach spaces. We show, that in duals of reflexive spaces w∗ -derived set of a convex subset coincides with its w∗ -closure. We also show, that subspace of a dual reflexive space is norming, if and only if it is total. Later we show, that in the dual of every non-reflexive space we can find a convex subset whose w∗ -derived set is not w∗ -closed. Hence, this statement is a characterisation of reflexive spaces. Next we show, that subspaces in duals of quasi-reflexive spaces are norming, if and only if they are total. Later we show, that in the dual of every non-quasi-reflexive space we can find a subspace which is total but not norming; thus, the previous statement is a characterisation of quasi-reflexive spaces. We also show, that for absolutely convex subsets of duals of quasi-reflexive spaces w∗ -derived set coincides with w∗ -closure. In the last section we define w∗ -derived sets of higher orders and show, that in the dual of every non-quasi-reflexive separable Banach space there exist subspaces of order of each countable non-limit ordinal and no other. 1
| Identifer | oai:union.ndltd.org:nusl.cz/oai:invenio.nusl.cz:388171 |
| Date | January 2018 |
| Creators | Silber, Zdeněk |
| Contributors | Kalenda, Ondřej, Spurný, Jiří |
| Source Sets | Czech ETDs |
| Language | Czech |
| Detected Language | English |
| Type | info:eu-repo/semantics/masterThesis |
| Rights | info:eu-repo/semantics/restrictedAccess |
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