Smith space explained

having a universal compact set, i.e. a compact set

which absorbs every other compact set

T\subseteqX

(i.e.

T\subseteqλ ⋅ K

for some

λ>0

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^[1]

X^\star

is a Smith space,

and vice versa, for any Smith space

its stereotype dual space

X^\star

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

X^\star

is a Smith space. The polar

K=B^\circ

of the unit ball

is the universal compact set in

X^\star

. If

X^*

denotes the normed dual space for

, and

the space

X^*

endowed with the

-weak topology, then the topology of

X^\star

lies between the topology of

X^*

and the topology of

, so there are natural (linear continuous) bijections

X^*\toX^\star\toX'.

is infinite-dimensional, then no two of these topologies coincide. At the same time, for infinite dimensional

the space

X^\star

is not barreled (and even is not a Mackey space if

is reflexive as a Banach space).

is a convex balanced compact set in a locally convex space

, then its linear span

{C}K=\operatorname{span}(K)

possesses a unique structure of a Smith space with

as the universal compact set (and with the same topology on

is a (Hausdorff) compact topological space, and

{lC}(M)

the Banach space of continuous functions on

(with the usual sup-norm), then the stereotype dual space

{lC}^\star(M)

(of Radon measures on

with the topology of uniform convergence on compact sets in

{lC}(M)

) is a Smith space. In the special case when

M=G

is endowed with a structure of a topological group the space

{lC}^\star(G)

becomes a natural example of a stereotype group algebra.

is a Smith space if and only if

is finite-dimensional.

References

Smith. M.F.. The Pontrjagin duality theorem in linear spaces. Annals of Mathematics. 1952. 56. 2. 248–253. 10.2307/1969798. 1969798.
Akbarov. S.S.. Pontryagin duality in the theory of topological vector spaces and in topological algebra. Journal of Mathematical Sciences. 2003. 113. 2. 179–349. 10.1023/A:1020929201133. 115297067. free.
Akbarov. S.S.. Holomorphic functions of exponential type and duality for Stein groups with algebraic connected component of identity. Journal of Mathematical Sciences. 2009. 162. 4. 459–586. 0806.3205. 10.1007/s10958-009-9646-1. 115153766.
PhD . Furber . R.W.J. . 2017 . Categorical Duality in Probability and Quantum Foundations. Radboud University.

Notes and References

The stereotype dual space to a locally convex space
X

is the space
X^\star

of all linear continuous functionals
f:X\toC

endowed with the topology of uniform convergence on totally bounded sets in
X

.

Smith space explained

Examples

See also

References

Notes and References