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We prove that if X is a compact topological space which contains a nontrivial metrizable connected closed subset, then the vector lattice C(X) does not carry any sygma-Lebesgue topology.

Lions-Peetre reiteration formulas for triples and their applications

Irina Asekritova, Natan Krugljak, Lech Maligranda, Lyudmila Nikolova, Lars-Erik Persson (2001)

Studia Mathematica

We present, discuss and apply two reiteration theorems for triples of quasi-Banach function lattices. Some interpolation results for block-Lorentz spaces and triples of weighted $L_{p}$ -spaces are proved. By using these results and a wavelet theory approach we calculate (θ,q)-spaces for triples of smooth function spaces (such as Besov spaces, Sobolev spaces, etc.). In contrast to the case of couples, for which even the scale of Besov spaces is not stable under interpolation, for triples we obtain stability...

Local/global uniform approximation of real-valued continuous functions

Anthony W. Hager (2011)

Commentationes Mathematicae Universitatis Carolinae

For a Tychonoff space $X$ , $C (X)$ is the lattice-ordered group ( $l$ -group) of real-valued continuous functions on $X$ , and $C^{*} (X)$ is the sub- $l$ -group of bounded functions. A property that $X$ might have is (AP) whenever $G$ is a divisible sub- $l$ -group of $C^{*} (X)$ , containing the constant function 1, and separating points from closed sets in $X$ , then any function in $C (X)$ can be approximated uniformly over $X$ by functions which are locally in $G$ . The vector lattice version of the Stone-Weierstrass Theorem is more-or-less equivalent...

Minimal Reflexive Banach Lattices.

Heinrich P. Lotz (1974)

Mathematische Annalen

Nonatomic Lipschitz spaces

Nik Weaver (1995)

Studia Mathematica

We abstractly characterize Lipschitz spaces in terms of having a lattice-complete unit ball and a separating family of pure normal states. We then formulate a notion of "measurable metric space" and characterize the corresponding Lipschitz spaces in terms of having a lattice complete unit ball and a separating family of normal states.

$O_{I}$ -абсолют и интегрируемые по Риману функции.

А.В. Колдунов (1987)

Sibirskij matematiceskij zurnal

On completely monotone functions on C+(X).

P. Ressel, J. Hoffmann-Jorgensen (1977)

Mathematica Scandinavica

On Co-Semigroups of Lattice Homomorphisms on a Banach Lattice.

Manfred Wolff (1978/1979)

Mathematische Zeitschrift

On Measures Integrating All Functions of a Given Vector Lattice.

Wolfgang Adamski (1987)

Monatshefte für Mathematik

On some density theorems in regular vector lattices of continuous functions.

Francesco Altomare, Mirella Cappelletti Montano (2007)

Collectanea Mathematica

In this paper, we establish some density theorems in the setting of particular locally convex vector lattices of continuous functions de ned on a locally compact Hausdorff space, which we introduced and studied in [3,4] and which we named regular vector lattices. In this framework, by using properties of the subspace of the so-called generalized af ne functions, we give a simple description of the closed vector sublattice, the closed Stone vector sublattice and the closed subalgebra generated by...

On some ergodic properties for continuous and affine functions

Charles J. K. Batty (1978)

Annales de l'institut Fourier

Two problems posed by Choquet and Foias are solved:(i) Let $T$ be a positive linear operator on the space $C (X)$ of continuous real-valued functions on a compact Hausdorff space $X$ . It is shown that if $n^{- 1} \sum_{r = 0}^{n - 1} T^{r} 1$ converges pointwise to a continuous limit, then the convergence is uniform on $X$ .(ii) An example is given of a Choquet simplex $K$ and a positive linear operator $T$ on the space $A (K)$ of continuous affine real-valued functions on $K$ , such that $\inf {(T^{n} 1) (x) : n \geq} < 1$ for each $x$ in $\partial_{ℓ} K$ , but $∥ T^{n} 1 ∥$ does not converge to 0.

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Inversion in a class of lattice-ordered algebras

Korovkinhüllen in Funktionenräumen.

La méthode d'interpolation complexe : applications aux treillis de Banach

Lattices with real numbers as additive operators [Book]

Les topologies sygma-Lebesgue sur C(X).

Lions-Peetre reiteration formulas for triples and their applications

Local/global uniform approximation of real-valued continuous functions

Minimal Reflexive Banach Lattices.

Nonatomic Lipschitz spaces

$O_{I}$ -абсолют и интегрируемые по Риману функции.

On completely monotone functions on C+(X).

On Co-Semigroups of Lattice Homomorphisms on a Banach Lattice.

On Measures Integrating All Functions of a Given Vector Lattice.

On some density theorems in regular vector lattices of continuous functions.

On some ergodic properties for continuous and affine functions

On the lattice boundary of Markov operators

On the lattice properties of invariant functions for Markov operators on C(X)

On the lattice structure of invariant functions for Markov operators on $C (X)$

On the Representation of Banach Lattices by Continuous Numerical Functions.

On the sequential order continuity of the $C (K)$ -space.

Currently displaying 21 – 40 of 74