HC-convergence theory of L -nets and L -ideals and some of its applications

A. A. Nouh

Mathematica Bohemica (2003)

  • Volume: 128, Issue: 4, page 349-366
  • ISSN: 0862-7959

Abstract

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In this paper we introduce and study the concepts of error -closed set and error -limit ( error -cluster) points of L -nets and L -ideals using the notion of almost N -compact remoted neighbourhoods in L -topological spaces. Then we introduce and study the concept of error -continuous mappings. Several characterizations based on error -closed sets and the error -convergence theory of L -nets and L -ideals are presented for error -continuous mappings.

How to cite

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Nouh, A. A.. "HC-convergence theory of $L$-nets and $L$-ideals and some of its applications." Mathematica Bohemica 128.4 (2003): 349-366. <http://eudml.org/doc/249213>.

@article{Nouh2003,
abstract = {In this paper we introduce and study the concepts of $\operatorname\{\text\{HC\}\}$-closed set and $\operatorname\{\text\{HC\}\}$-limit ($\operatorname\{\text\{HC\}\}$-cluster) points of $L$-nets and $L$-ideals using the notion of almost $N$-compact remoted neighbourhoods in $L$-topological spaces. Then we introduce and study the concept of $\operatorname\{\text\{HL\}\}$-continuous mappings. Several characterizations based on $\operatorname\{\text\{HC\}\}$-closed sets and the $\operatorname\{\text\{HC\}\}$-convergence theory of $L$-nets and $L$-ideals are presented for $\operatorname\{\text\{HL\}\}$-continuous mappings.},
author = {Nouh, A. A.},
journal = {Mathematica Bohemica},
keywords = {$L$-topology; remoted neighbourhood; almost $N$-compactness; $\operatorname\{\text\{HC\}\}$-closed set; $\operatorname\{\text\{HL\}\}$-continuity; $L$-net; $L$-ideal; $\operatorname\{\text\{HC\}\}$-convergence theory; -topology; remote neighbourhood; almost -compactness; -closed set; -continuity; -net; -ideal; -convergence theory},
language = {eng},
number = {4},
pages = {349-366},
publisher = {Institute of Mathematics, Academy of Sciences of the Czech Republic},
title = {HC-convergence theory of $L$-nets and $L$-ideals and some of its applications},
url = {http://eudml.org/doc/249213},
volume = {128},
year = {2003},
}

TY - JOUR
AU - Nouh, A. A.
TI - HC-convergence theory of $L$-nets and $L$-ideals and some of its applications
JO - Mathematica Bohemica
PY - 2003
PB - Institute of Mathematics, Academy of Sciences of the Czech Republic
VL - 128
IS - 4
SP - 349
EP - 366
AB - In this paper we introduce and study the concepts of $\operatorname{\text{HC}}$-closed set and $\operatorname{\text{HC}}$-limit ($\operatorname{\text{HC}}$-cluster) points of $L$-nets and $L$-ideals using the notion of almost $N$-compact remoted neighbourhoods in $L$-topological spaces. Then we introduce and study the concept of $\operatorname{\text{HL}}$-continuous mappings. Several characterizations based on $\operatorname{\text{HC}}$-closed sets and the $\operatorname{\text{HC}}$-convergence theory of $L$-nets and $L$-ideals are presented for $\operatorname{\text{HL}}$-continuous mappings.
LA - eng
KW - $L$-topology; remoted neighbourhood; almost $N$-compactness; $\operatorname{\text{HC}}$-closed set; $\operatorname{\text{HL}}$-continuity; $L$-net; $L$-ideal; $\operatorname{\text{HC}}$-convergence theory; -topology; remote neighbourhood; almost -compactness; -closed set; -continuity; -net; -ideal; -convergence theory
UR - http://eudml.org/doc/249213
ER -

References

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  1. Theory of L -fuzzy H -sets, Fuzzy Sets and Systems 51 (1992), 89–94. (1992) Zbl0788.54004MR1187375
  2. L -fuzzy N -continuous mappings, J. Fuzzy Math. 4 (1996), 621–629. (1996) MR1410635
  3. A new extension of fuzzy convergence, Fuzzy Sets and Systems 109 (2000), 199–204. (2000) MR1719626
  4. Fuzzy H -continuous functions, J. Fuzzy Math. 3 (1995), 135–145. (1995) MR1322865
  5. 10.1016/S0165-0114(96)00153-4, Fuzzy Sets and Systems 91 (1997), 355–359. (1997) Zbl0917.54011MR1481282DOI10.1016/S0165-0114(96)00153-4
  6. 10.1016/S0165-0114(96)00123-6, Fuzzy Sets and Systems 91 (1997), 115–122. (1997) MR1481275DOI10.1016/S0165-0114(96)00123-6
  7. Mathematics of Fuzzy Sets: Logic, Topology and Measure Theory, The Handbooks of Fuzzy Series 3, Kluwer Academic Publishers, Dordrecht, 1999. (1999) MR1788899
  8. Fuzzy Stone-Čech-type compactifications, Fuzzy Sets and Systems 33 (1989), 355–372. (1989) MR1033881
  9. 10.1016/0165-0114(90)90078-K, Fuzzy Sets and Systems 36 (1990), 55–66. (1990) MR1063271DOI10.1016/0165-0114(90)90078-K
  10. H -continuous functions, Bolletino U. M. I. 11 (1975), 552–558. (1975) MR0383336
  11. Almost compact fuzzy sets in fuzzy topological spaces, Fuzzy Sets and Systems 48 (1990), 389–396. (1990) MR1083070
  12. A new fuzzy compactness defined by fuzzy nets, J. Math. Anal. Appl. 94 (1983), 59–67. (1983) Zbl0512.54006MR0701446
  13. Generalized topological molecular lattices, Scientia Sinica (Ser. A) 27 (1984), 785–793. (1984) Zbl0599.54005MR0795162
  14. Theory of L -Fuzzy Topological Spaces, Shaanxi Normal University Press, Xi’an, 1988. (1988) 
  15. Ideal in topological molecular lattices, Acta Mathematica Sinica 29 (1986), 276–279. (1986) MR0855716
  16. 10.1016/0022-247X(87)90214-9, J. Math. Anal. Appl. 128 (1987), 64–79. (1987) Zbl0639.54006MR0915967DOI10.1016/0022-247X(87)90214-9

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