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On projective Z-frames

Published online by Cambridge University Press:  20 November 2018

Zhao Dongsheng
Zhao Dongsheng*
Affiliation:
Division of Mathematics School of Science Nanyang Technological University 469 Bukit Timah Road Singapore 259756, e-mail: [email protected]
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Abstract

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This paper deals with the projective objects in the category of all Z-frames, where the latter is a common generalization of different types of frames. The main result obtained here is that a Z-frame is E-projective if and only if it is stably Z-continuous, for a naturally arising collection E of morphisms.

Keywords

06D0554D1018D15
Type
Research Article
Information
Canadian Mathematical Bulletin , Volume 40 , Issue 1 , 01 March 1997 , pp. 39 - 46
Copyright
Copyright © Canadian Mathematical Society 1997

References

1. Balbes, R. and Dwinger, P., Distributive Lattices, University of Missouri Press, 1974.Google Scholar
2. Banaschewski, B., õ-frames, preprint.Google Scholar
3. Banaschewski, B., Another look at the localic Tychonoff Theorem, Comment. Math. Univ. Carolin. 29 (4) (1988), 647–656.Google Scholar
4. Banaschewski, B., On the injectivity of Boolean algebras, Comment. Math.Univ. Carolin. 34 (1993), 5010–511.Google Scholar
5. Banaschewski, B. and Niefield, S. B., Projective and supercoherent frames, J. Pure Appl. Algebra 70 (1991), 4551.Google Scholar
6. Bandelt, H. J. and Erné, M., The category of Z-continuous posets, J. Pure Appl. Algebra 30 (1983), 219226.Google Scholar
7. Bruns, G. and Lakser, H., Injective hulls of semilattices, Canad.Math. Bull. 13 (1970), 115118.Google Scholar
8. Gierz, G. et al, A compendium of continuous lattices, Springer-Verlag, Berlin, 1980.Google Scholar
9. Horn, A. and Kimura, N., The category of semilattices, Algebra Universalis, 1 (1971), 2638.Google Scholar
10. Johnstone, P. T., Stone spaces, Cambridge Studies Adv. Math. 3, Cambridge University press, 1983.Google Scholar
11. Johnstone, P. T. and Vickers, S. T., Preframes presentations present. In: Lecture Notes in Math. 1488, Springer-Verlag, 1991, 193212.Google Scholar
12. Rosebrugh, R. and Wood, R. J., Constructive Complete Distributivity IV, Appl. Categorical Structures 2 (1994), 119144.Google Scholar
13. Scott, D., Continuous lattices, Lecture Notes in Math., Springer-Verlag 274 (1972), 97136.Google Scholar
14. Wright, J. B., Wagner, E. G. and Thatcher, J. W., A uniform approach to inductive posets and inductive closure, Theoret. Comput. Sci. 7 (1978), 5777.Google Scholar
15. Zhao, D., Nuclei on Z-frames, Soochow J. Math. 22 (1996), 5974. ‘Google Scholar
16. Zhao, D., Generalization of frames and continuous lattices, Cambridge University Thesis, 1993.Google Scholar