• Title/Summary/Keyword: Lindel$\"{o}$f

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SOME REMARKS ON CENTERED-LINDELÖF SPACES

  • Song, Yan-Kui
    • Communications of the Korean Mathematical Society
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    • v.24 no.2
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    • pp.277-280
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    • 2009
  • In this paper, we prove the following two statements: (1) There exists a Hausdorff locally $Lindel{\ddot{o}}f$ centered-$Lindel{\ddot{o}}f$ space that is not star-$Lindel{\ddot{o}}f$. (2) There exists a $T_1$ locally compact centered-$Lindel{\ddot{o}}f$ space that is not star-$Lindel{\ddot{o}}f$. The two statements give a partial answer to Bonanzinga and Matveev [2, Question 1].

ALMOST LINDELÖF FRAMES

  • Khang, Mee Kyung
    • Korean Journal of Mathematics
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    • v.18 no.1
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    • pp.45-52
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    • 2010
  • Generalizing $Lindel{\ddot{o}}f$ frames and almost compact frames, we introduce a concept of almost $Lindel{\ddot{o}}f$ frames. Using a concept of ${\delta}$-filters on frames, we characterize almost $Lindel{\ddot{o}}f$ frames and then have their permanence properties. We also show that almost $Lindel{\ddot{o}}f$ regular $D({\aleph}_1)$ frames are exactly $Lindel{\ddot{o}}f$ frames. Finally we construct an almost $Lindel{\ddot{o}}fication$ of a frame L via the simple extension of L associated with the set of all ${\delta}$-filters F on L with ${\bigvee}\{x^*{\mid}x{\in}F\}=e$.

H-Closed Spaces and W-Lindelöf Spaces

  • Park, Jong-Suh
    • Journal of the Chungcheong Mathematical Society
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    • v.1 no.1
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    • pp.55-64
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    • 1988
  • We introduce the concept of a w-Lindel$\ddot{o}$f space which is a more general concept than that of a Lindel$\ddot{o}$f spaces. We obtain some characterization about H-closed sapces and w-Lindel$\ddot{o}$f spaces. Also, we investigate their invariance properties.

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COCOMPACT F-BASES AND RELATION BETWEEN COVER AND COMPACTIFICATION

  • Lee, Sang-Deok;Kim, Chang-Il
    • The Pure and Applied Mathematics
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    • v.3 no.2
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    • pp.163-171
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    • 1996
  • Observing that a locally weakly Lindel$\"{o}$f space is a quasi-F space if and only if it has an F-base, we show that every dense weakly Lindel$\"{o}$f subspace of an almost-p-space is C-embedded, every locally weakly Lindel$\"{o}$f space with a cocompact F-base is a locally compact and quasi-F space and that if Y is a dense weakly Lindel$\"{o}$f subspace of X which has a cocompact F-base, then $\beta$Y and X are homeomorphic. We also show that for any a separating nest generated intersection ring F on a space X, there is a separating nest generated intersection ring g on $\phi_{Y}^{-1}$(X) such that QF(w(X, F)) and ($\phi_{Y}^{-1}$(X),g) are homeomorphic and $\phi_{Y}_{x}$(g$^#$)=F$^#$.

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ON δ-FRAMES

  • Lee, Seung On;Lee, Seok Jong;Choi, Eun Ai
    • Journal of the Chungcheong Mathematical Society
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    • v.10 no.1
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    • pp.43-56
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    • 1997
  • In this paper, we introduce a new class of ${\delta}$-frames and study its properties. To do so, we introduce ${\delta}$-filters, almost Lindel$\ddot{o}$f frames and Lindel$\ddot{o}$f frames. First, we show that a complete chain or a complete Boolean algebra is a ${\delta}$-frame. Next, we show that a ${\delta}$-frame L is almost Lindel$\ddot{o}$f iff for any ${\delta}$-filter F in L, ${\vee}\{x^*\;:\;x{\in}F\}{\neq}e$. Last, we show that every regular Lindelof ${\delta}$-frame is normal and a Lindel$\ddot{o}$f ${\delta}$-frame is preserved under a ${\delta}$-isomorphism which is dense and codense.

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STRONG τ-MONOLITHICITY AND FRECHET-URYSOHN PROPERTIES ON Cp(X)

  • Kim, Jun-Hui;Cho, Myung-Hyun
    • Honam Mathematical Journal
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    • v.31 no.2
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    • pp.233-237
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    • 2009
  • In this paper, we show that: (1) every strongly ${\omega}$-monolithic space X with countable fan-tightness is Fr$\'{e}$chet-Urysohn; (2) a direct proof of that X is Lindel$\"{o}$f when $C_p$(X) is Fr$\'{e}$chet-Urysohn; and (3) X is Lindel$\"{o}$f when X is paraLindel$\"{o}$f and $C_p$(X) is AP. (3) is a generalization of the result of [8]. And we give two questions related to Fr$\'{e}$chet-Urysohn and AP properties on $C_p$(X).

C-LINDELÖF SPACES

  • Park, Jong-Suh
    • Journal of the Chungcheong Mathematical Society
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    • v.2 no.1
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    • pp.75-80
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    • 1989
  • In this paper we introduce the notion of C-lindel$\ddot{o}$f spaces, and we discuss some of the properties that C-Lindel$\ddot{o}$f spaces satisfy.

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LINDELÖFICATION OF BIFRAMES

  • Khang, Mee Kyoung
    • Korean Journal of Mathematics
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    • v.16 no.3
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    • pp.379-388
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    • 2008
  • We introduce countably strong inclusions ${\triangleleft}=({\triangleleft}_1,\;{\triangleleft}_2)$ on a biframe $L=(L_0,\;L_1,\;L_2)$ and i-strongly regular ${\sigma}$-ideals (i =1, 2) and then using them, we construct biframe $Lindel{\ddot{o}}fication$ of L. Furthermore, we obtain a sufficient condition for which L has a unique countably strong inclusion.

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MINIMAL QUASI-F COVERS OF SOME EXTENSION

  • Kim, Chang Il;Jung, Kap Hun
    • Journal of the Chungcheong Mathematical Society
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    • v.26 no.2
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    • pp.427-433
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    • 2013
  • Observing that every Tychonoff space X has an extension $kX$ which is a weakly Lindel$\ddot{o}$f space and the minimal quasi-F cover $QF(kX)$ of $kX$ is a weakly Lindel$\ddot{o}$f, we show that ${\Phi}_{kX}:QF(kX){\rightarrow}kX$ is a $z^{\sharp}$-irreducible map and that $QF({\beta}X)=QF(kX)$. Using these, we prove that $QF(kX)=kQF(X)$ if and only if ${\Phi}^k_X:kQF(X){\rightarrow}kX$ is an onto map and ${\beta}QF(X)=(QF{\beta}X)$.