论文信息 - Stone-C˘ech Compactifications of Ditopological Texture Spaces

Stone-C˘ech Compactifications of Ditopological Texture Spaces

A texturing on a set S is a point separating, complete, completely distributive lattice S of subsets of S with respect to inclusion which contains S, Ø and for which arbitrary meet coincides with intersection and finite joins coincide with union. Then (S, S) is called a texture space. In this paper, a suitable evaluation difunction is defined and an approach for the construction of the Stone-C˘ech compactification of ditopological texture spaces is given. It is also shown that the Stone-C˘ech compactification of a topological space can be obtained using highly economic structure of the unit texture.

Murat Diker | Aysşegül Altay Uğur

[1] Ralph Kopperman,et al. Asymmetry and duality in topology , 1995 .

[2] Murat Diker,et al. One-point compactifications of ditopological texture spaces , 2004, Fuzzy Sets Syst..

[3] Murat Diker,et al. Connectedness in ditopological texture spaces , 1999, Fuzzy Sets Syst..

[4] Senol Dost,et al. Ditopological texture spaces and fuzzy topology - III: Separation axioms , 2006, Fuzzy Sets Syst..

[5] Lawrence M. Brown,et al. Fuzzy sets as texture spaces, I. Representation theorems , 2000, Fuzzy Sets Syst..

[6] Murat Diker,et al. Paracompactness and Full Normality in Ditopological Texture Spaces , 1998 .

[7] Senol Dost,et al. Ditopological texture spaces and fuzzy topology, I. Basic concepts , 2004, Fuzzy Sets Syst..

[8] Lawrence M. Brown,et al. A textural view of the distinction between uniformities and quasi-uniformities , 2006 .

[9] Mustafa Demirci,et al. Textures and C-spaces , 2007, Fuzzy Sets Syst..

[10] Rudolf-E. Hoffmann,et al. Continuous posets, prime spectra of completely distributive complete lattices, and Hausdorff compactifications , 1981 .

[11] Marcel Erné,et al. Scott convergence and scott topology in partially ordered sets II , 1981 .

[12] Murat Diker,et al. Ditopological texture spaces and intuitionistic sets , 1998, Fuzzy Sets Syst..

[13] L. M. Brown,et al. Categories of Dicompact bi-T 2 texture spaces and a Banach-Stone theorem , 2007 .