In functional analysis and related areas of mathematics, a Smith space is a complete compactly generated locally convex topological vector space having a universal compact set, i.e. a compact set which absorbs every other compact set (i.e. for some ).
Smith spaces are named after Marianne Ruth Freundlich Smith, who introduced them as duals to Banach spaces in some versions of duality theory for topological vector spaces. All Smith spaces are stereotype and are in the stereotype duality relations with Banach spaces:
* for any Banach space its stereotype dual space is a Smith space,
* and vice versa, for any Smith space its stereotype dual space is a Banach space.
Smith spaces are special cases of Brauner spaces.
Examples
- As follows from the duality theorems, for any Banach space its stereotype dual space is a Smith space. The polar of the unit ball in is the universal compact set in . If denotes the normed dual space for , and the space endowed with the -weak topology, then the topology of lies between the topology of and the topology of , so there are natural (linear continuous) bijections
:
If is infinite-dimensional, then no two of these topologies coincide. At the same time, for infinite dimensional the space is not barreled (and even is not a Mackey space if is reflexive as a Banach space).
See also
Notes
References