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Tytuł artykułu

Between local connectedness and sum connectedness

Identyfikatory
Warianty tytułu
Języki publikacji
EN
Abstrakty
EN
A new generalization of local connectedness called Z-local connectedness is introduced. Basic properties of Z-locally connected spaces are studied and their place in the hierarchy of variants of local connectedness, which already exist in the literature, is elaborated. The class of Z-locally connected spaces lies strictly between the classes of pseudo locally connected spaces (Commentations Math. 50(2)(2010),183-199) and sum connected spaces ( weakly locally connected spaces) (Math. Nachrichten 82(1978), 121-129; Ann. Acad. Sci. Fenn. AI Math. 3(1977), 185- 205) and so contains all quasi locally connected spaces which in their turn contain all almost locally connected spaces introduced by Mancuso (J. Austral. Math. Soc. 31(1981), 421-428). Formulations of product and subspace theorems for Z-locally connected spaces are suggested. Their preservation under mappings and their interplay with mappings are discussed. Change of topology of a Z-locally connected space is considered so that it is simply a locally connected space in the coarser topology. It turns out that the full subcategory of Z-locally connected spaces provides another example of a mono-coreflective subcategory of TOP which properly contains all almost locally connected spaces.
Rocznik
Strony
3--16
Opis fizyczny
Bibliogr. 38 poz.
Twórcy
autor
  • Department of Mathematics, Hindu College, University of Delhi, Delhi-110007, India
autor
  • Department of Mathematics, Sri Aurobindo College, University of Delhi, Delhi-110017, India
autor
  • Department of Mathematics, A. R. S. D. College, University of Delhi, Delhi-110021, India
Bibliografia
  • [1] R.A. Alo and H.L. Shapiro, Normal Topological Spaces, Cambridge University Press, London, 1974.
  • [2] A.V. Arhangel’skii, General Topology III, Springer Verlag, Berlin Heidelberg, 1995.
  • [3] C.E. Aull, On C and C_-embeddings, Indag. Math.(N.S) 37 (1975), 26–33.
  • [4] ´A. Császár, Separation properties of θ-modification of topologies, Acta Math. Hungar. 102 (1-2) (2004), 151–157.
  • [5] A.J. D’Aristotle, Quasicompact and functionally Hausdorff spaces, J. Australian Math. Soc. 15 (1973), 319–324
  • [6] A.M. Gleason, Universal locally connected refinements, Illinois J. Math. 7 (1963), 521–531.
  • [7] H. Herrlich and G.E. Strecker, Coreflective subcategories, Trans. Amer. Math. Soc. 157 (1971), 205–226.
  • [8] H. Herrlich and G.E. Strecker, Category Theory, Allyn and Bacon Inc., Boston, 1973.
  • [9] R.C. Jain, The role of regularly open sets in general topology, Ph.D. Thesis Meerut University, Institute of Advanced Studies, Meerut, India 1980.
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  • [11] J.K. Kohli, A class of spaces containing all connected and all locally connected spaces, Math. Nachrichten 82 (1978), 121–129.
  • [12] J.K. Kohli and R. Kumar, z-supercontinuous functions, Indian J. Pure Appl. Math. 33 (7) (2002), 1097–1108.
  • [13] J.K. Kohli and D. Singh, D_-supercontinuous functions, Indian J. Pure Appl. Math. 34 (7) (2003), 1089–1100.
  • [14] J.K. Kohli and D. Singh, Between weak continuity and set connectedness, Studii Si Cercetari Stintifice Seria Mathematica 15 (2005), 55–65.
  • [15] J.K. Kohli and D. Singh, Function spaces and strong variants of continuity, App. Gen. Top. 9 (1) (2008), 33–38.
  • [16] J.K. Kohli, D. Singh and J. Aggarwal, R-supercontinuous functions, Demonstratio Math. 43 (3) (2010), 703–723.
  • [17] J.K.Kohli, D.Singh and R. Kumar, Generalizations of z-supercontinuous functions and Dδ- supercontinuous functions, App. Gen. Top. 9 (2) (2008), 239–251.
  • [18] J.K. Kohli, D. Singh and R. Kumar, Some properties of strongly _-continuous functions, Bulletin Cal. Math. Soc. 100 (2) (2008), 185–196.
  • [19] J.K. Kohli, D. Singh R. Kumar and J. Aggarwal, Between continuity and set connectedness, App. Gen. Top. 11 (1) (2010), 43–55.
  • [20] J.K. Kohli, D. Singh and B.K. Tyagi, Quasi locally connected spaces and pseudo locally connected spaces, Commentationes Math. 50 (2) (2010), 183–199.
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  • [24] V.J.Mancuso, Almost locally connected spaces, J. Austral. Math. Soc. 31 (1981), 421–428.
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  • [33] D.Singh, cl-supercontinuous functions, App. Gen. Top. 8 (2) (2007), 293–300.
  • [34] A. Sostak, On a class of topological spaces containing all bicompact and connected spaces, General Topology and its Relations to Modern Analysis and Algebra IV: Proceedings of the 4th Prague Topological Symposium (1976), Part B, 445–451.
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Typ dokumentu
Bibliografia
Identyfikator YADDA
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