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Facial Topologies for Subspaces of C(X).

Eggert Briem (1974)

Mathematische Annalen

Factorization in some Fréchet algebras of differentiable functions

Jürgen Voigt (1984)

Studia Mathematica

Familias compactas de funciones holomorfas con desarrollo asintótico en abierto de Cn.

Piedad Guijarro Carranza (1986)

Stochastica

Let U be an open convex subset of Cn, n belonging to N, such that the set of all polinomies is dense in the space of all holomorphic and complex functions on U, (H(U), t0), where t0 is the open-compact topology.We endow the space HK(U) of all holomorphic functions on U that have asymptotic expansion at the origin with a metric and we study a particular compact subset of HK(U).

Families of functions dominated by distributions of $C$ -classes of mappings

Goo Ishikawa (1983)

Annales de l'institut Fourier

A subsheaf of the sheaf $ℰ_{Ω}$ of germs $C^{\infty}$ functions over an open subset $Ω$ of $R^{n}$ is called a sheaf of sub $C^{\infty}$ function. Comparing with the investigations of sheaves of ideals of $ℰ_{Ω}$ , we study the finite presentability of certain sheaves of sub $C^{\infty}$ -rings. Especially we treat the sheaf defined by the distribution of Mather’s $𝒞$ -classes of a $C^{\infty}$ mapping.

Fastautomorphe Funktionen auf komplexen Räumen.

Horst S. Holdgrün (1973)

Mathematische Annalen

Filters and sequences

Sławomir Solecki (2000)

Fundamenta Mathematicae

We consider two situations which relate properties of filters with properties of the limit operators with respect to these filters. In the first one, we show that the space of sequences having limits with respect to a $Π_{3}^{0}$ filter is itself $Π_{3}^{0}$ and therefore, by a result of Dobrowolski and Marciszewski, such spaces are topologically indistinguishable. This answers a question of Dobrowolski and Marciszewski. In the second one, we characterize universally measurable filters which fulfill Fatou’s lemma.

Finite families of $ℓ_{p}$ -spaces and multirectangular characteristics.

Zakharyuta, V.P., Chalov, P.A. (2001)

Sibirskij Matematicheskij Zhurnal

Fixpunktsatz und monotone Lösungen der Differentialgleichung $y^{(n)} + B (x, y, y^{'}, \dots, y^{(n - 1)}) y = 0$

Marko Švec (1966)

Archivum Mathematicum

Flat spaces of continuous functions

Peter Nyikos, Juan Schäffer (1972)

Studia Mathematica

Fonctionnelles invariantes et courants basiques

A. Abouqateb, A. El Kacimi Alaoui (2000)

Studia Mathematica

Dans ce travail: (1) on caractérise l’espace $C_{G}$ des fonctionnelles invariantes par un groupe compact G opérant linéairement et continûment sur un espace vectoriel topologique localement convexe séparé et séquentiellement complet E plus précisément, on montre que $C_{G}$ est le dual topologique du sous-espace $E_{G}$ des vecteurs de E qui sont G-invariants. (2) On étudie les courants basiques sur une variété feuilletée (V,ℱ). On obtient alors, dans le cas où le feuilletage est associé à une action localement...

Fonctions analytiques de Krasner-Tate

Jean-Paul Bezivin (1974/1975)

Groupe de travail d'analyse ultramétrique

Fonctions dérivables

Michel Leduc (1969/1970)

Séminaire Choquet. Initiation à l'analyse

Formes linéaires $p$ -adiques

Daniel Barsky (1969/1970)

Séminaire Delange-Pisot-Poitou. Théorie des nombres

Fragmentability and compactness in C(K)-spaces

B. Cascales, G. Manjabacas, G. Vera (1998)

Studia Mathematica

Let K be a compact Hausdorff space, $C_{p} (K)$ the space of continuous functions on K endowed with the pointwise convergence topology, D ⊂ K a dense subset and $t_{p} (D)$ the topology in C(K) of pointwise convergence on D. It is proved that when $C_{p} (K)$ is Lindelöf the $t_{p} (D)$ -compact subsets of C(K) are fragmented by the supremum norm of C(K). As a consequence we obtain some Namioka type results and apply them to prove that if K is separable and $C_{p} (K)$ is Lindelöf, then K is metrizable if, and only if, there is a countable and dense...

Fréchet quotients of spaces of real-analytic functions

P. Domański, L. Frerick, D. Vogt (2003)

Studia Mathematica

We characterize all Fréchet quotients of the space (Ω) of (complex-valued) real-analytic functions on an arbitrary open set $Ω \subseteq ℝ^{d}$ . We also characterize those Fréchet spaces E such that every short exact sequence of the form 0 → E → X → (Ω) → 0 splits.

Fréchet spaces of continuous vector-valued functions: Complementability in dual Fréchet spaces and injectivity

P. Domański, L. Drewnowski (1992)

Studia Mathematica

Fréchet spaces of strongly, weakly and weak*-continuous Fréchet space valued functions are considered. Complete solutions are given to the problems of their injectivity or embeddability as complemented subspaces in dual Fréchet spaces.

Free uniform measures

Jan K. Pachl (1974)

Commentationes Mathematicae Universitatis Carolinae

Function spaces in the Stegall class

Ivaylo S. Kortezov (1999)

Commentationes Mathematicae Universitatis Carolinae

We prove several stability properties for the class of compact Hausdorff spaces $T$ such that $C (T)$ with the weak or the pointwise topology is in the class of Stegall. In particular, this class is closed under arbitrary products.

Function spaces on semitopological semigroups.

P. Milnes, J.S. Pym (1980)

Semigroup forum

Functional Banach spaces of holomorphic functions on Reinhardt domains

Jacob Burbea (1988)

Annales Polonici Mathematici

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