In functional analysis and related areas of mathematics, a Montel space, named after Paul Montel, is any topological vector space (TVS) in which an analog of Montel's theorem holds. Specifically, a Montel space is a barrelled topological vector space in which every closed and bounded subset is compact.

Definition edit

A topological vector space (TVS) has the Heine–Borel property if every closed and bounded subset is compact. A Montel space is a barrelled topological vector space with the Heine–Borel property. Equivalently, it is an infrabarrelled semi-Montel space where a Hausdorff locally convex topological vector space is called a semi-Montel space or perfect if every bounded subset is relatively compact.[note 1] A subset of a TVS is compact if and only if it is complete and totally bounded. A Fréchet–Montel space is a Fréchet space that is also a Montel space.

Characterizations edit

A separable Fréchet space is a Montel space if and only if each weak-* convergent sequence in its continuous dual is strongly convergent.[1]

A Fréchet space   is a Montel space if and only if every bounded continuous function   sends closed bounded absolutely convex subsets of   to relatively compact subsets of   Moreover, if   denotes the vector space of all bounded continuous functions on a Fréchet space   then   is Montel if and only if every sequence in   that converges to zero in the compact-open topology also converges uniformly to zero on all closed bounded absolutely convex subsets of   [2]

Sufficient conditions edit

Semi-Montel spaces

A closed vector subspace of a semi-Montel space is again a semi-Montel space. The locally convex direct sum of any family of semi-Montel spaces is again a semi-Montel space. The inverse limit of an inverse system consisting of semi-Montel spaces is again a semi-Montel space. The Cartesian product of any family of semi-Montel spaces (resp. Montel spaces) is again a semi-Montel space (resp. a Montel space).

Montel spaces

The strong dual of a Montel space is Montel. A barrelled quasi-complete nuclear space is a Montel space.[1] Every product and locally convex direct sum of a family of Montel spaces is a Montel space.[1] The strict inductive limit of a sequence of Montel spaces is a Montel space.[1] In contrast, closed subspaces and separated quotients of Montel spaces are in general not even reflexive.[1] Every Fréchet Schwartz space is a Montel space.[3]

Properties edit

Montel spaces are paracompact and normal.[4] Semi-Montel spaces are quasi-complete and semi-reflexive while Montel spaces are reflexive.

No infinite-dimensional Banach space is a Montel space. This is because a Banach space cannot satisfy the Heine–Borel property: the closed unit ball is closed and bounded, but not compact. Fréchet Montel spaces are separable and have a bornological strong dual. A metrizable Montel space is separable.[1]

Fréchet–Montel spaces are distinguished spaces.

Examples edit

In classical complex analysis, Montel's theorem asserts that the space of holomorphic functions on an open connected subset of the complex numbers has this property.[citation needed]

Many Montel spaces of contemporary interest arise as spaces of test functions for a space of distributions. The space   of smooth functions on an open set   in   is a Montel space equipped with the topology induced by the family of seminorms[5]

 
for   and   ranges over compact subsets of   and   is a multi-index. Similarly, the space of compactly supported functions in an open set with the final topology of the family of inclusions   as   ranges over all compact subsets of   The Schwartz space is also a Montel space.

Counter-examples edit

Every infinite-dimensional normed space is a barrelled space that is not a Montel space.[6] In particular, every infinite-dimensional Banach space is not a Montel space.[6] There exist Montel spaces that are not separable and there exist Montel spaces that are not complete.[6] There exist Montel spaces having closed vector subspaces that are not Montel spaces.[7]

See also edit

Notes edit

  1. ^ A subset   of a topological space   is called relatively compact is its closure in   is compact.

References edit

  1. ^ a b c d e f Schaefer & Wolff 1999, pp. 194–195.
  2. ^ Lindström 1990, pp. 191–196.
  3. ^ Khaleelulla 1982, pp. 32–63.
  4. ^ "Topological vector space". Encyclopedia of Mathematics. Retrieved September 6, 2020.
  5. ^ Hogbe-Nlend & Moscatelli 1981, p. 235
  6. ^ a b c Khaleelulla 1982, pp. 28–63.
  7. ^ Khaleelulla 1982, pp. 103–110.

Bibliography edit