arXiv:0903.0154 Abstract | arXiv Analytics

arXiv:0903.0154 [math.GN]Abstract References Reviews Resources

The unit ball of the Hilbert space in its weak topology

Published 2009-03-01Version 1

We show that the unit ball of a Hilbert space in its weak topology is a continuous image of the countable power of the Alexandroff compactification of a discrete set, and we deduce some combinatorial properties of its lattice of open sets which are not shared by the balls of other equivalent norms when the space is nonseparable.

Journal: Proc. Am. Math. Soc. 135, No. 3, 833-836 (2007)

Categories: math.GN, math.FA

Subjects: 46B50, 46B26, 46C05, 54B30

Keywords: hilbert space, weak topology, unit ball, equivalent norms, open sets

Tags: journal article

Related articles: Most relevant | Search more

arXiv:0903.0163 [math.GN] (Published 2009-03-01)

The number of weakly compact convex subsets of the Hilbert space

Antonio Avilés

arXiv:2412.12554 [math.GN] (Published 2024-12-17)

Towards a Unified Framework for Bioperations on $e^\star$-Open Sets in Topological Spaces

G. Saravanakumar, M. Arun

arXiv:1703.03066 [math.GN] (Published 2017-03-08)

Absolute $F_{σδ}$ spaces

Vojtěch Kovařík, Ondřej Kalenda

arXiv Analytics

arXiv:0903.0154 [math.GN]Abstract References Reviews Resources

The unit ball of the Hilbert space in its weak topology

Links

Toolbox

arXiv:0903.0154 [math.GN]AbstractReferencesReviewsResources

The unit ball of the Hilbert space in its weak topology

Links

Toolbox

arXiv:0903.0154 [math.GN]Abstract References Reviews Resources