Abstract
As generalizations of Ehresmann semigroups, P-Ehresmann semigroups were firstly introduced and investigated by Jones [12]. From a varietal perspective, P-Ehresmann semigroups are derived from reducts of regular ◦-semigroups. In this paper, inspired by the approach of Jones, P-Ehresmann semigroups are further extended to weakly P-Ehresmann semigroups derived instead from reducts of regular semigroups with a quasi-ideal regular ◦-transversal. After studying the basic properties of weakly P-Ehresmann semigroups, we obtain a construction theorem for these semigroups by using P-Ehresmann semigroups, left normal partial bands and right normal partial bands satisfying natural compatibility conditions. Special cases are also considered, and examples are provided to illustrate the relationships among these special cases.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Auinger, K.: Free locally inverse *-semigroups. Czechoslovak Math. J. 43, 523–545 (1993)
Blyth, T.S., McFadden, R.B.: Regular semigroups with a multiplicative inverse transversal. Proc. Roy. Soc. Edinburgh Sect. A 92, 253–270 (1982)
T. S. Blyth, Inverse transversal–a guided tour, in: Proceedings of the International Conference on Semigroups 1999, World Scientific (2000), pp. 26–43
El-Qallali, A.: Abundant semigroups with a multiplicative type \(A\) transversal. Semigroup Forum 47, 327–340 (1993)
X. J. Guo, Abundant semigroups with a multiplicative adequate transversal, Acta Math. Sin. (Engl. Ser.), 18 (2002), 229–244
Gomes, G.M.S., Szendrei, M.B.: Almost factorizable weakly ample semigroups. Commun. Algebra 35, 3503–3523 (2007)
V. Gould, Restriction and Ehresmann semigroups, in: Proceedings of the International Conference on Algebra 2010: Advances in Algebraic Structures, World Scientific (2011), pp. 265–288
J. M. Howie, An Introduction to Semigroup Theory, Academic Press (London, 1976)
Hall, T.E., Imaoka, T.: Representations and amalgamation of generalized inverse *-semigroups. Semigroup Forum 58, 126–141 (1999)
Hollings, C.: From right PP monoids to restriction semigroups: a survey. Eur. J. Pure Appl. Math. 2, 21–57 (2009)
Imaoka, T., Inata, I., Yokoyama, H.: Representations of locally inverse *-semigroups. Internat. J. Algebra Comput. 6, 541–551 (1996)
Jones, P.R.: A common framework for restriction semigroups and regular *-semigroups. J. Pure Appl. Algebra 216, 618–632 (2012)
Jones, P.R.: Varieties of \(P\)-restriction semigroups. Commun. Algebra 42, 1811–1834 (2014)
Jones, P.R.: Almost perfect restriction semigroups. J. Algebra 445, 193–220 (2016)
Kudryavtseva, G.: Partial monoid actions and a class of restriction semigroups. J. Algebra 429, 342–370 (2015)
M. V. Lawson, Inverse Semigroups, World Scientific (Singapore, 1998)
Lawson, M.V.: Semigroups and ordered categories I: The reduced case. J. Algebra 141, 422–462 (1991)
Li, Y.H.: A class of regular semigroups with regular *-transversals. Semigroup Forum 65, 43–57 (2002)
Li, Y.H.: On regular semigoups with a quasi-ideal regular *-transversals. Adv. Math. (China) 32, 727–738 (2003)
Li, Y.H., Wang, S.F., Zhang, R.H.: Regular semigroups with regular *-transversals. J. Southwest China Normal Univ. 31, 52–56 (2006)
Nordahl, T.E., Scheiblich, H.E.: Regular *-semigroups. Semigroup Forum 16, 369–377 (1978)
M. Petrich, Inverse Semigroups, Wiley (New York, 1984)
M. Petrich and N. R. Reilly, Completely Regular Semigroups, A Wiley–Interscience Publication (New York, 1999)
F. Pastijn and J. Albert, Semilattice transversals of regular bands. I, Commun. Algebra, 45 (2017), 4979–4991
Pastijn, F., Albert, J.: Semilattice transversals of regular bands. II, Semigroup Forum 95, 423–440 (2017)
Scheiblich, H.E.: Generalized inverse semigroups with involution. Rocky Mountain J. Math. 12, 205–211 (1982)
Szendrei, M.B.: Free *-orthodox semigroups. Simon Stevin 59, 175–201 (1985)
Szendrei, M.B.: Embedding into almost left factorizable restriction semigroups. Commun. Algebra 41, 1458–1483 (2013)
Saito, T.: Structure of regular semigroups with a quasi-ideal inverse transversal. Semigroup Forum 31, 305–309 (1985)
Tang, X.L.: Regular semigroups with inverse transversals. Semigroup Forum 55, 24–32 (1997)
Tang, X.L.: Identities for a class of regular unary semigroups. Commun. Algebra 36, 2487–2502 (2008)
Wang, S.F., Liu, Y.: On \(P\)-regular semigroups having regular *-transversals. Semigroup Forum 76, 561–575 (2008)
S. F. Wang and D. Zhang, Regular semigroups with regular *-transversals, Acta. Math. Sin. (Chin. Ser.), 54 (2011), 591–600
Wang, S.F.: On algebras of \(P\)-Ehresmann semigroups and their associate partial semigroups. Semigroup Forum 95, 569–588 (2017)
Wang, S.F.: On pseudo-Ehresmann semigroups. J. Aust. Math. Soc. 105, 257–288 (2018)
Wang, S.F.: An Ehresmann-Schein-Nambooripad type theorem for a class of \(P\)-restriction semigroups. Bull. Malays. Math. Sci. Soc. 42, 535–568 (2019)
Wang, S.F.: An Ehresmann-Schein-Nambooripad theorem for locally Ehresmann \(P\)-Ehresmann semigroups. Period. Math. Hungar. 80, 108–137 (2020)
Author information
Authors and Affiliations
Corresponding author
Additional information
This paper is supported partially by Nature Science Foundation of China (11661082).
Rights and permissions
About this article
Cite this article
Wang, SF., Yan, QF. On Weakly P-Ehresmann Semigroups. Acta Math. Hungar. 163, 335–362 (2021). https://doi.org/10.1007/s10474-021-01135-9
Received:
Revised:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s10474-021-01135-9