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Displaying 101 – 120 of 215

Moment Sequences for Ultradistributions.

Ioana Cioranescu (1990)

Mathematische Zeitschrift

Montel and reflexive preduals of spaces of holomorphic functions on Fréchet spaces

Christopher Boyd (1993)

Studia Mathematica

For U open in a locally convex space E it is shown in [31] that there is a complete locally convex space G(U) such that $G {(U)}_{i}^{'} = (ℋ (U), τ_{δ})$ . Here, we assume U is balanced open in a Fréchet space and give necessary and sufficient conditions for G(U) to be Montel and reflexive. These results give an insight into the relationship between the $τ_{0}$ and $τ_{ω}$ topologies on ℋ (U).

Necessary conditions for normal solvability in duals of LF-spaces.

Manfred Möller (1987)

Manuscripta mathematica

Nevanlinna algebras

A. Haldimann, H. Jarchow (2001)

Studia Mathematica

The Nevanlinna algebras, $_{α}^{p}$ , of this paper are the $L^{p}$ variants of classical weighted area Nevanlinna classes of analytic functions on = z ∈ ℂ: |z| < 1. They are F-algebras, neither locally bounded nor locally convex, with a rich duality structure. For s = (α+2)/p, the algebra $F_{s}$ of analytic functions f: → ℂ such that ${(1 - | z |)}^{s} | f (z) | \to 0$ as |z| → 1 is the Fréchet envelope of $_{α}^{p}$ . The corresponding algebra $_{s}^{\infty}$ of analytic f: → ℂ such that $s u p_{z \in} {(1 - | z |)}^{s} | f (z) | < \infty$ is a complete metric space but fails to be a topological vector space. $F_{s}$ is also...

Non-archimedean nuclearity

Nicole de Grande-de Kimpe (1981/1982)

Groupe de travail d'analyse ultramétrique

Nuclear Fréchet Spaces with Locally Round Finite Dimensional Decompositions.

Ed Dubinsky, Lasse Holmström (1984)

Monatshefte für Mathematik

Nuclear Fréchet spaces without the bounded approximation property

Ed Dubinsky (1981)

Studia Mathematica

On a class of nuclear spaces - I

Köthe, Gottfried (1982)

Portugaliae mathematica

On a Problem of Bellenot and Dubinsky.

Erhard Behrends, Susanne Dierolf, Peter Harmand (1986)

Mathematische Annalen

On a Tensor Product Characterization of Nuclearity.

K. John, V. Zizler (1979)

Mathematische Annalen

On certain subspaces of a nuclear power series spaces of finite type

A. Aytuna, T. Terzioğlu (1981)

Studia Mathematica

On completely continuous maps from locally convex spaces to l1.

Santiago Díaz Madrigal (1990)

Extracta Mathematicae

On exact sequences of quojections.

G. Metafune, V. B. Moscatelli (1991)

Revista Matemática de la Universidad Complutense de Madrid

We give some general exact sequences for quojections from which many interesting representation results for standard twisted quojections can be deduced. Then the methods are also generalized to the case of nuclear Fréchet spaces.

On extending and lifting continuous linear mappings in topological vector spaces

W. Gejler (1978)

Studia Mathematica

On Grothendieck space ideals.

Jesús M. Fernández Castillo (1988)

Collectanea Mathematica

On ideals of operators and of locally convex spaces.

Marilda A. Simoes (1985)

Collectanea Mathematica

On isomorphic classification of tensor products $E_{\infty} (a) \otimes ̂ E_{\infty}^{'} (b)$ [Book]

Goncharov A., Zahariuta V., Terzioğlu Tosun (1996)

On Malgrange Theorem for Nuclear Holomorphic Functions in Open Balls of a Banach Space.

Mário C. Matos (1978)

Mathematische Zeitschrift

On multipliers of temperate distributions

Jan Kučera (1971)

Czechoslovak Mathematical Journal

On non-primary Fréchet Schwartz spaces

J. Díaz (1997)

Studia Mathematica

Let E be a Fréchet Schwartz space with a continuous norm and with a finite-dimensional decomposition, and let F be any infinite-dimensional subspace of E. It is proved that E can be written as G ⨁ H where G and H do not contain any subspace isomorphic to F. In particular, E is not primary. If the subspace F is not normable then the statement holds for other quasinormable Fréchet spaces, e.g., if E is a quasinormable and locally normable Köthe sequence space, or if E is a space of holomorphic functions...

Currently displaying 101 – 120 of 215

Previous Page 6 Next

Displaying 101 – 120 of 215

On isomorphic classification of tensor products E ∞ ( a ) ⊗ ̂ E ∞ ' ( b ) [Book]

Currently displaying 101 – 120 of 215

On isomorphic classification of tensor products $E_{\infty} (a) \otimes ̂ E_{\infty}^{'} (b)$ [Book]