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It is proved that a Fréchet space is quasinormable if, and only if, every quotient space satisfies the density condition of Heinrich. This answers positively a conjecture of Bonet and Díaz

The Density Condition in Subspaces and Quotients of Frechet Spaces.

José Bonet, Juan C. Diaz (1994)

Monatshefte für Mathematik

The non-archimedean space $𝒞^{\infty} (X)$

N. de Grande-de Kimpe (1983)

Compositio Mathematica

The non-archimedian space BC(X) with the strict topology.

Nicole De Grande-De Kimpe, Samuel Navarro (1994)

Publicacions Matemàtiques

Let X be a zero-dimensional, Hausdorff topological space and K a field with non-trivial, non-archimedean valuation under which it is complete. Then BC(X) is the vector space of the bounded continuous functions from X to K. We obtain necessary and sufficient conditions for BC(X), equipped with the strict topology, to be of countable type and to be nuclear in the non-archimedean sense.

The projective tensor product of Fréchet-Montel spaces

Jari Taskinen (1988)

Studia Mathematica

The property (Hu) and (Ω) with the exponential representation of holomorphic functions.

Nguyen Minh Ha, Nguyen Van Khue (1994)

Publicacions Matemàtiques

The main aim of this paper is to prove that a nuclear Fréchet space E has the property (Hu) (resp. (Ω)) if and only if every holomorphic function on E (resp. on some dense subspace of E) can be written in the exponential form.

The Steinitz theorem on rearrangement of series for nuclear spaces.

Wojciech Banaszczyk (1990)

Journal für die reine und angewandte Mathematik

The tensor product of a locally pseudo-convex and a nuclear space

L. Waelbroeck (1970)

Studia Mathematica

The uniform classification of boundedly compact locally convex spaces

Sven Heinrich (1986)

Czechoslovak Mathematical Journal

Topological classification of strong duals to nuclear (LF)-spaces

Taras Banakh (2000)

Studia Mathematica

We show that the strong dual X’ to an infinite-dimensional nuclear (LF)-space is homeomorphic to one of the spaces: $ℝ^{ω}$ , $ℝ^{\infty}$ , $Q \times ℝ^{\infty}$ , $ℝ^{ω} \times ℝ^{\infty}$ , or ${(ℝ^{\infty})}^{ω}$ , where $ℝ^{\infty} = l i m ℝ^{n}$ and $Q = {[- 1, 1]}^{ω}$ . In particular, the Schwartz space D’ of distributions is homeomorphic to ${(ℝ^{\infty})}^{ω}$ . As a by-product of the proof we deduce that each infinite-dimensional locally convex space which is a direct limit of metrizable compacta is homeomorphic either to $ℝ^{\infty}$ or to $Q \times ℝ^{\infty}$ . In particular, the strong dual to any metrizable infinite-dimensional Montel space is homeomorphic either...

Topological tensor products of a Fréchet-Schwartz space and a Banach space

Alfredo Peris (1993)

Studia Mathematica

We exhibit examples of countable injective inductive limits E of Banach spaces with compact linking maps (i.e. (DFS)-spaces) such that $E \otimes_{ε} X$ is not an inductive limit of normed spaces for some Banach space X. This solves in the negative open questions of Bierstedt, Meise and Hollstein. As a consequence we obtain Fréchet-Schwartz spaces F and Banach spaces X such that the problem of topologies of Grothendieck has a negative answer for $F ⨶_{π} X$ . This solves in the negative a question of Taskinen. We also give...

Topologies and Bornologies Determined by Operator Ideals.

Yau-Chuen Wong, Ngai-Ching Wong (1988)

Mathematische Annalen

Topologies and bornologies determined by operator ideals, II

Ngai-Ching Wong (1994)

Studia Mathematica

Let be an operator ideal on LCS’s. A continuous seminorm p of a LCS X is said to be - continuous if $Q ̃_{p} \in^{i n j} (X, X ̃_{p})$ , where $X ̃_{p}$ is the completion of the normed space $X_{p} = X / p^{- 1} (0)$ and $Q ̃_{p}$ is the canonical map. p is said to be a Groth()- seminorm if there is a continuous seminorm q of X such that p ≤ q and the canonical map $Q ̃_{p q} : X ̃_{q} \to X ̃_{p}$ belongs to $(X ̃_{q}, X ̃_{p})$ . It is well known that when is the ideal of absolutely summing (resp. precompact, weakly compact) operators, a LCS X is a nuclear (resp. Schwartz, infra-Schwartz) space if and only if every continuous...

Triplets conucléaires en théorie des champs

Paul Krée (1976/1977)

Séminaire Paul Krée

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