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Displaying 81 – 100 of 241

Inverse invariance of metrizability for ordered spaces

T. Przymusiński (1973)

Colloquium Mathematicae

I-weight of compact and locally compact LOTS

Brad Bailey (2007)

Commentationes Mathematicae Universitatis Carolinae

Ram’ırez-Páramo proved that under GCH for the class of compact Hausdorff spaces i-weight reflects all cardinals [A reflection theorem for i-weight, Topology Proc. 28 (2004), no. 1, 277–281]. We show that in ZFC i-weight reflects all cardinals for the class of compact LOTS. We define local i-weight, then calculate i-weight of locally compact LOTS and paracompact spaces in terms of the extent of the space and the i-weight of open sets or the local i-weight. For locally compact LOTS we find a necessary...

$L J$ -spaces

Yin-Zhu Gao (2007)

Czechoslovak Mathematical Journal

In this paper $L J$ -spaces are introduced and studied. They are a common generalization of Lindelöf spaces and $J$ -spaces researched by E. Michael. A space $X$ is called an $L J$ -space if, whenever ${A, B}$ is a closed cover of $X$ with $A \cap B$ compact, then $A$ or $B$ is Lindelöf. Semi-strong $L J$ -spaces and strong $L J$ -spaces are also defined and investigated. It is demonstrated that the three spaces are different and have interesting properties and behaviors.

Large free set

Kandasamy Muthuvel (1992)

Colloquium Mathematicae

Lattice of $E$ -compact topological spaces

Jan Pelant (1973)

Commentationes Mathematicae Universitatis Carolinae

Left translations of compact semilattices and generalizations

Thomas Bowman (1975)

Czechoslovak Mathematical Journal

Left-separated spaces: a comment to a paper of M. G. Tkačenko

Petr Simon (1979)

Commentationes Mathematicae Universitatis Carolinae

Linear and $ℝ$ -linear betweenness spaces

Juraj Šimko (2001)

Mathematica Slovaca

Local connectivity and maps onto non-metrizable arcs.

Nikiel, J., Treybig, L.B., Tuncali, H.M. (1997)

International Journal of Mathematics and Mathematical Sciences

Local convexity in topological lattices

Miller, John Boris (1979)

Portugaliae mathematica

Locally connected images of ordered compacta

L. B. Treybig (1986)

Colloquium Mathematicae

Maximal Elements in Ordered Topological Spaces

Mihai Turinici (1979)

Δελτίο της Ελληνικής Μαθηματικής Εταιρίας

Maximality principle and general results of Ekeland and Caristi types without lower semicontinuity assumptions in cone uniform spaces with generalized pseudodistances.

Włodarczyk, Kazimierz, Plebaniak, Robert (2010)

Fixed Point Theory and Applications [electronic only]

Measurability of Functions of Two Variables

Jozef Dravecký, Tibor Neubrunn (1973)

Matematický časopis

Measure and measurable functions of $S^{n}$

Angeliki Kontolatou (1994)

Acta Mathematica et Informatica Universitatis Ostraviensis

Metrizability of certain Pixley-Roy spaces

Harold Bennett, William Fleissner, David Lutzer (1980)

Fundamenta Mathematicae

Metrizability of trees

Carl Eberhart (1969)

Fundamenta Mathematicae

Metrization of uniform lattices

Hans Weber (1993)

Czechoslovak Mathematical Journal

Modifications of the double arrow space and related Banach spaces C(K)

Witold Marciszewski (2008)

Studia Mathematica

We consider the class of compact spaces $K_{A}$ which are modifications of the well known double arrow space. The space $K_{A}$ is obtained from a closed subset K of the unit interval [0,1] by “splitting” points from a subset A ⊂ K. The class of all such spaces coincides with the class of separable linearly ordered compact spaces. We prove some results on the topological classification of $K_{A}$ spaces and on the isomorphic classification of the Banach spaces $C (K_{A})$ .

Monotone extenders for bounded c-valued functions

Kaori Yamazaki (2010)

Studia Mathematica

Let c be the Banach space consisting of all convergent sequences of reals with the sup-norm, $C_{\infty} (A, c)$ the set of all bounded continuous functions f: A → c, and $C_{A} (X, c)$ the set of all functions f: X → c which are continuous at each point of A ⊂ X. We show that a Tikhonov subspace A of a topological space X is strong Choquet in X if there exists a monotone extender $u : C_{\infty} (A, c) \to C_{A} (X, c)$ . This shows that the monotone extension property for bounded c-valued functions can fail in GO-spaces, which provides a negative answer to a question...

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