Timeline for Are there non-reflexive vector spaces isomorphic to their bi-dual?
Current License: CC BY-SA 2.5
9 events
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Nov 16, 2010 at 3:27 | comment | added | Philip Brooker | It is, Yemon, and it is also in Megginson's book and Beauzamy's book 'Introduction to Banach spaces and their geometry'; in the latter case it is covered as a series of exercises. | |
Nov 4, 2010 at 6:13 | comment | added | Yemon Choi | Might this be in Kalton and Albiac's recent book, perhaps? | |
Oct 29, 2010 at 15:21 | comment | added | diverietti | Just because it is not included in every textbook on Banach space theory. Anyway, I just said that it would have been nice to have a brief account here. It doesn't matter! I'll take a look at the paper. Thanks. | |
Oct 29, 2010 at 14:35 | comment | added | Gerald Edgar | This construction should be in every textbook on Banach space theory. Why does it need to be added here? jstor.org/pss/2041285 This first page is visible for free, and has a norm for the isomorphic version of the question displayed. The second dual can be described the same way, but change the condition of limit zero to limit exists. Thus the space has codimension 1 in the second dual. | |
Oct 29, 2010 at 8:18 | comment | added | diverietti | It would be nice if you could give an idea of how it works here. | |
Oct 28, 2010 at 20:30 | vote | accept | diverietti | ||
Oct 28, 2010 at 16:31 | history | edited | Pete L. Clark | CC BY-SA 2.5 |
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Oct 28, 2010 at 15:50 | history | edited | Gerald Edgar | CC BY-SA 2.5 |
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Oct 28, 2010 at 15:44 | history | answered | Gerald Edgar | CC BY-SA 2.5 |