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Über Peano-Kurven.

W. Wunderlich (1973)

Elemente der Mathematik

Ultrametric spaces bi-Lipschitz embeddable in $ℝ^{n}$

Kerkko Luosto (1996)

Fundamenta Mathematicae

It is proved that if an ultrametric space can be bi-Lipschitz embedded in $ℝ^{n}$ , then its Assouad dimension is less than n. Together with a result of Luukkainen and Movahedi-Lankarani, where the converse was shown, this gives a characterization in terms of Assouad dimension of the ultrametric spaces which are bi-Lipschitz embeddable in $ℝ^{n}$ .

Ultraparacompactness in certain Pixley-Roy hyperspaces

Harold Bennett, William Fleissner, David Lutzer (1981)

Fundamenta Mathematicae

Ultrasmoothness in dendroids

Isabel Puga, Miriam Torres (2008)

Colloquium Mathematicae

The class of ultrasmooth dendroids is contained in the class of smooth dendroids and contains the class of locally connected dendroids. In this paper we study relationships between ultrasmoothness and smoothness in dendroids and we characterize ultrasmooth dendroids.

Una extensión transfinita de la dimensión por recubrimientos.

Regino Criado Herrero, Juan Tarrés (1987)

Collectanea Mathematica

Uncountable ω-limit sets with isolated points

Chris Good, Brian E. Raines, Rolf Suabedissen (2009)

Fundamenta Mathematicae

We give two examples of tent maps with uncountable (as it happens, post-critical) ω-limit sets, which have isolated points, with interesting structures. Such ω-limit sets must be of the form C ∪ R, where C is a Cantor set and R is a scattered set. Firstly, it is known that there is a restriction on the topological structure of countable ω-limit sets for finite-to-one maps satisfying at least some weak form of expansivity. We show that this restriction does not hold if the ω-limit set is uncountable....

Une approche non-standard de la dimension d'un espace topologique

B. Brunet (1997)

Annales mathématiques Blaise Pascal

Unicoherence in means

Philip Bacon (1970)

Colloquium Mathematicae

Unified spaces and singular sets for mappings of locally compact spaces

R. F. Dickamn, Jr. (1968)

Fundamenta Mathematicae

Uniform dimension of mappings (Preliminary communication)

Jan Hejcman (1965)

Commentationes Mathematicae Universitatis Carolinae

Uniform sequences of $ε$ -mappings

Overton, Robert (1973)

Portugaliae mathematica

Uniformization of Topological Spaces with Small Inductive Dimension Zero.

K.A. Broughan (1973)

Mathematische Annalen

Unique $a$ -closure for some $ℓ$ -groups of rational valued functions

Anthony W. Hager, Chawne M. Kimber, Warren W. McGovern (2005)

Czechoslovak Mathematical Journal

Usually, an abelian $ℓ$ -group, even an archimedean $ℓ$ -group, has a relatively large infinity of distinct $a$ -closures. Here, we find a reasonably large class with unique and perfectly describable $a$ -closure, the class of archimedean $ℓ$ -groups with weak unit which are “ $ℚ$ -convex”. ( $ℚ$ is the group of rationals.) Any $C (X, ℚ)$ is $ℚ$ -convex and its unique $a$ -closure is the Alexandroff algebra of functions on $X$ defined from the clopen sets; this is sometimes $C (X)$ .

Universal acyclic resolutions for arbitrary coefficient groups

Michael Levin (2003)

Fundamenta Mathematicae

We prove that for every compactum X and every integer n ≥ 2 there are a compactum Z of dimension ≤ n+1 and a surjective $U V^{n - 1}$ -map r: Z → X such that for every abelian group G and every integer k ≥ 2 such that $d i m_{G} X \leq k \leq n$ we have $d i m_{G} Z \leq k$ and r is G-acyclic.

Universal analytic preorders arising from surjective functions

Riccardo Camerlo (2005)

Fundamenta Mathematicae

Examples are presented of Σ₁¹-universal preorders arising by requiring the existence of particular surjective functions. These are: the relation of epimorphism between countable graphs; the relation of being a continuous image (or a continuous image of some specific kind) for continua; the relation of being continuous open image for dendrites.

Universal completely regular dendrites

K. Omiljanowski, S. Zafiridou (2005)

Colloquium Mathematicae

We define a dendrite $E_{n}$ which is universal in the class of all completely regular dendrites with order of points not greater than n. In particular, the dendrite $E_{ω}$ is universal in the class of all completely regular dendrites. The construction starts with the standard universal dendrite $D_{n}$ of order n described by J. J. Charatonik.

Universal continua

Ray Russo (1979)

Fundamenta Mathematicae

Universal mappings and weakly confluent mappings

Sam Nadler (1980)

Fundamenta Mathematicae

Universal maps of Cartesian products

W. Holsztyński, R. Strube (1980)

Fundamenta Mathematicae

Universal meager $F_{σ}$ -sets in locally compact manifolds

Taras O. Banakh, Dušan Repovš (2013)

Commentationes Mathematicae Universitatis Carolinae

In each manifold $M$ modeled on a finite or infinite dimensional cube ${[0, 1]}^{n}$ , $n \leq ω$ , we construct a meager $F_{σ}$ -subset $X \subset M$ which is universal meager in the sense that for each meager subset $A \subset M$ there is a homeomorphism $h : M \to M$ such that $h (A) \subset X$ . We also prove that any two universal meager $F_{σ}$ -sets in $M$ are ambiently homeomorphic.

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