You are here

Home ยป Content

Naturally Ordered Abundant Semigroups for which each Idempotent has a Greatest Inverse

Journal Name:

  • European Journal of Pure and Applied Mathematics

Publication Year:

  • 2011

Key Words:

Author NameUniversity of Author

AMS Codes:

Abstract (2. Language): 
G-regular and reflexive naturally ordered abundant semigroups each of whose idempotents has a greatest inverse are studied. In this paper, we give a construction theorem for such ordered semigroups. Our theorem extends a previous structure theorem on naturally ordered abundant semigroups of X.J. Guo and X.Y. Xie [13]. Some other results related to naturally ordered regular semigroups are amplified and strengthened.
Bookmark/Search this post with
FULL TEXT (PDF): 
PDF icon arastirmax-naturally-ordered-abundant-semigroups-which-each-idempotent-has-greatest-inverse.pdf
  • 3
210-220
  • English

REFERENCES

References: 

[1] T.S. Blyth and R.B. McFadden, Naturally ordered regular semigroups with a greatest
idempotnt, Proc. Roy. Soc. Edinb., 91A, 107-122. 1981.
[2] T.S. Blyth and R.B. McFadden, Regular semigroups with multiplicative inverse transversals,
Proc. Roy. Soc. Edinb., 92A, 253-270. 1981.
[3] T.S. Blyth and R.B. McFadden, Maximum idempotents in naturally ordered regular semigroups,
Proc. Edinb. Math. Soc., 26, 213-220. 1983.
[4] T.S. Blyth and G.A.P. Pinto, On naturally ordered regular semigroups with biggest inverses,
Semigroup Forum, 54, 154-165. 1997.
[5] T.S. Blyth and M.H. Almeida Santos, On naturally ordered regular semigroups with
biggest idempotents, Comm. Algebra, 21, 1761-1771. 1993
[6] T.S. Blyth and M.H. Alemeida Santos, Naturally ordered orthodox Dubreil-Jacotin semigroups,
Comm. Algebra, 20, 1167-1199. 1992.
[7] T.S. Blyth and M.H. Alemeida Santos, Naturally ordered regular semigroups with an
inverse monoid transversal, Semigroup Forum, 76, 71-86. 2008.
[8] A. El-Qallali, Abundant semigroups with a multiplicative type-A transversal, Semigroup
Forum, 47, 327-340. 1993
[9] J.B. Fountain, Adequate semigroups, Proc. Edinb. Math. Soc. 22, 113-125. 1979.
[10] J.B. Fountain, Abundant semigroups, Proc. London Math. Soc. 44, 103-129. 1982.
[11] X.J. Guo, Amenably natural order abundant semigroups, Adv. Math. (China), 30,683-
690. 2001.
[12] X.J. Guo, C.C. Ren and K.P. Shum, A structure theorem of an ordered rpp semigroups
with max-idempotents. To appear in Algebra Colloqium.
[13] X.J. Guo and X.Y. Xie, Naturally ordered semigroups in which each idempotent has a
greatest inverse, Commun. Algebra 35, 2324-2339. 2007.
[14] X.J. Guo, R.H. Zhang and X.N. Li, Natural Dubreil-Jacotin abundant semigroups, J.
Math. (China),29, 329-334. 2000
[15] X.J. Guo, W. Chen and K.P. Shum, On left negatively ordered rpp semigroups, Inter. J.
Pure Appl. Math., 32, 105-116. 2006.
[16] X.J. Guo and K.P. Shum, The Lawson partial orders on rpp semigroups, Inter. J. Pure
Appl. Math., 29, 415-423. 2006.
[17] J.M. Howie, An introduction to semigroup theory, Academic Press, London, 1976.
[18] K.P. Shum and X.M. Ren, Abundant semigroups and their special subclasses, Proceedings
of International Conference on Algebra and its Applicatons (ICAA 2002), Chulalongkorn
Univ., Bangkok, p. 66-86. 2002.
[19] T. Saito, Natually ordered regular semigroups with maximum inverses, Proc. Edinb.
Math. Soc. 32, 33-39. 1989.

Thank you for copying data from http://www.arastirmax.com