Grothendieck space

In mathematics, a Grothendieck space, named after Alexander Grothendieck, is a Banach space X every weakly* convergent sequence in the dual space X* converges with respect to the weak topology of X*.

Characterisations

Let X be a Banach space. Then the following conditions are equivalent:

  1. X is a Grothendieck space,
  2. for every separable Banach space Y, every bounded linear operator from X to Y is weakly compact, that is, the image of a bounded subset of X is a weakly compact subset of Y,
  3. for every weakly compactly generated Banach space Y, every bounded linear operator from X to Y is weakly compact.

Examples

See also

References

  1. J. Bourgain, H is a Grothendieck space, Studia Math., 75 (1983), 193–216.


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