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Let ${𝒫_{n}}$ be a sequence of covers of a space $X$ such that ${s t (x, 𝒫_{n})}$ is a network at $x$ in $X$ for each $x \in X$ . For each $n \in ℕ$ , let $𝒫_{n} = {P_{β} : β \in Λ_{n}}$ and $Λ_{n}$ be endowed the discrete topology. Put $M = {b = (β_{n}) \in Π_{n \in ℕ} Λ_{n} : {P_{β_{n}}}$ forms a network at some point $x_{b} i n X}$ and $f : M ⟶ X$ by choosing $f (b) = x_{b}$ for each $b \in M$ . In this paper, we prove that $f$ is a sequentially-quotient (resp. sequence-covering, compact-covering) mapping if and only if each $𝒫_{n}$ is a $c s^{*}$ -cover (resp. $f c s$ -cover, $c f p$ -cover) of $X$ . As a consequence of this result, we prove that $f$ is a sequentially-quotient, $s$ -mapping if and only if it is...

On topologies generating the Effros Borel structure and on the Effros measurability of the boundary operation

B. S. Spahn (1980)

Colloquium Mathematicae

On trivially semi-metrizable and D-completely regular mappings

F. Cammaroto, G. Nordo, B. A. Pasynkov (2002)

Bollettino dell'Unione Matematica Italiana

Trivially symmetrizable, trivially semi-metrizable and trivially D-completely regular mappings are defined. They are characterized as mappings parallel to symmetrizable, semi-metrizable and D-completely regular spaces correspondently. One shows that trivially D-completely regular mappings, i.e. submappings of fibrewise products of developable mappings coincide (up to homeomorphisms) with submappings of fibrewise products of semi-metrizable mappings.

On ultrametric space.

Gajić, Ljiljana (2001)

Novi Sad Journal of Mathematics

On uniform spaces with linearly ordered bases II ( $ω_{μ}$ -metric spaces)

P. Nyikos, H. Reichel (1976)

Fundamenta Mathematicae

On Urysohn's universal separable metric space

Charles Joiner (1971)

Fundamenta Mathematicae

On Weakly Measurable Functions

Szymon Żeberski (2005)

Bulletin of the Polish Academy of Sciences. Mathematics

We show that if T is an uncountable Polish space, 𝓧 is a metrizable space and f:T→ 𝓧 is a weakly Baire measurable function, then we can find a meagre set M ⊆ T such that f[T∖M] is a separable space. We also give an example showing that "metrizable" cannot be replaced by "normal".

On weak-open compact images of metric spaces.

Yin, Zhiyun (2006)

International Journal of Mathematics and Mathematical Sciences

On $α$ -distance in three dimensional space.

Gelişgen, Özcan, Kaya, Rüstem (2006)

APPS. Applied Sciences

On $π$ -images of metric spaces.

Ge, Ying (2006)

Acta Mathematica Academiae Paedagogicae Nyí regyháziensis. New Series [electronic only]

On $π$ -metrizable spaces, their continuous images and products

Derrick Stover (2009)

Commentationes Mathematicae Universitatis Carolinae

A space $X$ is said to be $π$ -metrizable if it has a $σ$ -discrete $π$ -base. The behavior of $π$ -metrizable spaces under certain types of mappings is studied. In particular we characterize strongly $d$ -separable spaces as those which are the image of a $π$ -metrizable space under a perfect mapping. Each Tychonoff space can be represented as the image of a $π$ -metrizable space under an open continuous mapping. A question posed by Arhangel’skii regarding if a $π$ -metrizable topological group must be metrizable receives...

We prove that every 3-generalized metric space is metrizable. We also show that for any ʋ with ʋ ≥ 4, not every ʋ-generalized metric space has a compatible symmetric topology.

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Displaying 81 – 100 of 103

On the tangency of sets in generalized metric spaces for certain functions of the class $F_{ρ}^{*}$

On the tangency of sets in metric spaces

On the weak-open images of metric spaces

On the weight of nowhere dense subsets in compact spaces.

On the $ω$ -primitive

On three equivalences concerning Ponomarev-systems