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Warianty tytułu
Języki publikacji
Abstrakty
In the paper we investigate topological properties of a topological Brandt λ0-extension B0λ(S) of a semitopological monoid S with zero. In particular we prove that for every Tychonoff pseudocompact (resp., Hausdorff countably compact, Hausdorff compact) semitopological monoid S with zero there exists a unique semiregular pseudocompact (resp., Hausdorff countably compact, Hausdorff compact) extension B0λ(S) of S and establish their Stone-Cˇ ech and Bohr compactifications. We also describe a category whose objects are ingredients in the constructions of pseudocompact (resp., countably compact, sequentially compact, compact) topological Brandt λ0- extensions of pseudocompact (resp., countably compact, sequentially compact, compact) semitopological monoids with zeros.
Wydawca
Czasopismo
Rocznik
Tom
Strony
60-79
Opis fizyczny
Daty
otrzymano
2012-11-26
zaakceptowano
2013-09-10
online
2013-12-31
Twórcy
autor
-
Department of Mechanics and Mathematics,
National University of Lviv, Universytetska 1, Lviv, 79000, Ukraine, ovgutik@yahoo.com
autor
-
Institute of Mathematics, University of Tartu,
J. Liivi 2, 50409, Tartu, Estonia, kateryna.pavlyk@ut.ee
Bibliografia
- [1] A. V. Arhangel’skij, Function spaces in the topology of pointwise convergence, and compact sets, Uspekhi Mat. Nauk39:5 (1984), 11–50 (in Russian); English version: Russ. Math. Surv. 39:5 (1984), 9–56.
- [2] A. V. Arkhangel’skii, Topological Function Spaces, Kluwer Publ., Dordrecht, 1992.
- [3] A. H. Clifford, Matrix representations of completely simple semigroups, Amer. J. Math. 64 (1942), 327–342.[Crossref]
- [4] I. Bucur and A. Deleanu, Introduction to the Theory of Categories and Functors, John Willey and Sons, Ltd., London,New York and Sidney, 1968.
- [5] A. H. Clifford and G. B. Preston, The Algebraic Theory of Semigroups, Vol. I. Amer. Math. Soc. Surveys 7, 1961;Vol. II. Amer. Math. Soc. Surveys 7, 1967.
- [6] W. W. Comfort and K. A. Ross, Pseudocompactness and uniform continuity in topological groups, Pacif. J. Math. 16(1966), 483–496.
- [7] K. DeLeeuw, and I. Glicksberg, Almost-periodic functions on semigroups, Acta Math. 105 (1961), 99–140.[Crossref]
- [8] R. Engelking, General Topology, 2nd ed., Heldermann, Berlin, 1989.
- [9] O. V. Gutik, On Howie semigroup, Mat. Metody Phys.-Mech. Fields 42:4 (1999), 127–132 (in Ukrainian).
- [10] O. V. Gutik and K. P. Pavlyk, H-closed topological semigroup and Brandt λ-extensions, Mat. Metody Phys.-Mech.Fields 44:3 (2001), 20–28 (in Ukrainian).
- [11] O. V. Gutik and K. P. Pavlyk, Topological semigroups of matrix units, Algebra Discrete Math. no. 3 (2005), 1–17.
- [12] O. V. Gutik and K. P. Pavlyk, On Brandt λ0-extensions of semigroups with zero, Mat. Metody Phis.-Mech. Polya.49:3 (2006), 26–40.
- [13] O. Gutik, K. Pavlyk, and A. Reiter, Topological semigroups of matrix units and countably compact Brandt λ0-extensions, Mat. Stud. 32:2 (2009), 115–131.
- [14] O. V. Gutik, K. P. Pavlyk and A. R. Reiter, On topological Brandt semigroups, Math. Methods and Phys.-Mech.Fields 54:2 (2011), 7–16 (in Ukrainian); English Version in: J. Math. Sc. 184:1 (2012), 1–11.
- [15] O. Gutik and D. Repovš, On countably compact 0-simple topological inverse semigroups, Semigroup Forum 75:2(2007), 464–469.[WoS]
- [16] O. Gutik and D. Repovš, On Brandt λ0-extensions of monoids with zero, Semigroup Forum 80:1 (2010), 8–32.[WoS]
- [17] J. M. Howie, Fundamentals of Semigroup Theory, London Math. Monographs, New Ser. 12, Clarendon Press, Oxford,1995.
- [18] W. D. Munn, Matrix representations of semigroups, Proc. Cambridge Phil. Soc. 53 (1957), 5–12.[Crossref]
- [19] M. Petrich, Inverse Semigroups, John Wiley & Sons, New York, 1984.
- [20] E. A. Reznichenko, Extension of functions defined on products of pseudocompact spaces and continuity of the inversein pseudocompact groups, Topology Appl. 59:3 (1994), 233–244.[Crossref]
- [21] W. Ruppert, Compact Semitopological Semigroups: An Intrinsic Theory, Lecture Notes in Mathematics, Vol. 1079,Springer, Berlin, 1984.
Typ dokumentu
Bibliografia
Identyfikatory
Identyfikator YADDA
bwmeta1.element.doi-10_2478_taa-2013-0007