Вісник Львівського університету. Серія механіко-математична

Given two elements $x,y$ of a semigroup $X$ we write $x\ll y$ if for every homomorphism $\chi :X\to \{0,1\}$ we have $\chi \left(x\right)\le \chi \left(y\right)$. The quasiorder $\ll$ is called the binary quasiorder on $X$. It induces the equivalence relation $\Updownarrow$ that coincides with the least semilattice congruence on $X$. In the paper we discuss some known and new properties of the binary quasiorder on semigroups.

F. Al-Kharousi, A. J. Cain, V. Maltcev, and A. Umar, A countable family of finitely presented infinite congruence-free monoids, Acta Sci. Math. (Szeged) 81 (2015), no. 3-4, 437-445. DOI: 10.14232/actasm-013-028-z

T. Banakh, E-Separated semigroups, arXiv:2202.06298, 2022, preprint.

T. Banakh and S. Bardyla, Complete topologized posets and semilattices, Topology Proc. 57 (2021), 177-196.

T. Banakh and S. Bardyla, Characterizing categorically closed commutative semigroups, J. Algebra. 591 (2022), 84-110. DOI: 10.1016/j.jalgebra.2021.09.030

T. Banakh and S. Bardyla, Categorically closed countable semigroups, arXiv:1806.02869, 2018, preprint.

T. Banakh and S. Bardyla, Absolutely closed commutative semigroups, in preparation.

T. Banakh and S. Bardyla, Categorically closed Clifford semigroups, in preparation.

S. Bardyla, Classifying locally compact semitopological polycyclic monoids, Math. Bull. Shev. Sci. Soc. 13 (2016), 13-28.

S. Bardyla, On universal objects in the class of graph inverse semigroups, Eur. J. Math. 6 (2020), no. 1, 4-13. DOI: 10.1007/s40879-018-0300-7

S. Bardyla, and O. Gutik, On a semitopological polycyclic monoid, Algebra Discrete Math. 21 (2016), no. 2, 163-183.

S. O. Bardyla and O. V. Gutik, On a complete topological inverse polycyclic monoid, Carp. Math. Publ. 8 (2016), no. 2, 183-194. DOI: 10.15330/cmp.8.2.183-194

S. Bogdanovic and M.Ciric, Primitive $\pi$-regular semigroups, Proc. Japan Acad. Ser. A Math. Sci. 68 (1992), no. 10, 334-337. DOI: 10.3792/pjaa.68.334

S. M. Bogdanovic, M. D. Ciric, and Z. Lj. Popovic, Semilattice decompositions of semigroups, University of Nis, Nis, 2011. viii+321 pp.

A. J. Cain and V. Maltcev, A simple non-bisimple congruence-free finitely presented monoid, Semigroup Forum 90 (2015), no. 1, 184-188. DOI: 10.1007/s00233-014-9607-y

M. Ciric and S. Bogdanovic, Decompositions of semigroups induced by identities, Semigroup Forum 46 (1993), no. 3, 329-346. DOI: 10.1007/BF02573576

M.Ciric and S. Bogdanovic, Semilattice decompositions of semigroups, Semigroup Forum 52 (1996), no. 2, 119-132. DOI: 10.1007/BF02574089

J. L. Galbiati, Some semilattices of semigroups each having one idempotent, Semigroup Forum 55 (1997), no. 2, 206-214. DOI: 10.1007/PL00005922

R. S. Gigon, $\eta$-simple semigroups without zero and ${\eta }^{*}$-simple semigroups with a least non-zero idempotent, Semigroup Forum 86 (2013), no. 1, 108-113. DOI: 10.1007/s00233-012-9408-0

J. M. Howie, Fundamentals of semigroup theory, London Math. Soc. Monographs. New Ser. 12, Clarendon Press, Oxford, 1995.

J. M. Howie and G. Lallement, Certain fundamental congruences on a regular semigroup, Proc. Glasgow Math. Assoc. 7 (1966), no. 3, 145-159. DOI: 10.1017/S2040618500035334

M. S. Mitrovic, Semilattices of Archimedean semigroups, With a foreword by Donald B. McAlister. University of Nis. Faculty of Mechanical Engineering, Nis, 2003. xiv+160 pp.

M. S. Mitrovic, On semilattices of Archimedean semigroup - a survey, I. M. Araujo, (ed.) et al., Semigroups and languages. Proc. of the workshop, Lisboa, Portugal, November 27–-29, 2002. River Edge, NJ: World Scientific. 2004, pp. 163-195. DOI: 10.1142/9789812702616_0010

M. Mitrovic, D. A Romano, and M. Vincic, A theorem on semilattice-ordered semigroup, Int. Math. Forum 4 (2009), no. 5-8, 227-232.

M. Mitrovic and S. Silvestrov, Semilatice decompositions of semigroups. Hereditariness and periodicity - an overview, S. Silvestrov (ed.) et al., Algebraic structures and applications. Selected papers based on the presentations at the international conference on stochastic processes and algebraic structures - from theory towards applications, SPAS 2017, Vasteras and Stockholm, Sweden, October 4-6, 2017. Cham: Springer. Springer Proc. Math. Stat. 317, 2020, pp. 687-721. DOI: 10.1007/978-3-030-41850-2_29

M. Petrich, The maximal semilattice decomposition of a semigroup, Bull. Amer. Math. Soc. 69 (1963), no. 3, 342-344. DOI: 10.1090/S0002-9904-1963-10912-X

M. Petrich, The maximal semilattice decomposition of a semigroup, Math. Z. 85 (1964), 68-82. DOI: 10.1007/BF01114879

M. Petrich, Introduction to semigroups, Merrill Research and Lecture Series. Charles E. Merrill Publishing Co., Columbus, Ohio, 1973. viii+198 pp.

M. Petrich and N. R. Reilly, Completely regular semigroups, Wiley-Intersci. Publ. John Wiley & Sons, Inc., New York, 1999.

Z. Popovic, S. Bogdanovic, and M. Ciric, A note on semilattice decompositions of completely $\pi$-regular semigroups, Novi Sad J. Math. 34 (2004), no. 2, 167-174.

M. S. Putcha, Semilattice decompositions of semigroups, Semigroup Forum 6 (1973), no. 1, 12-34. DOI: 10.1007/BF02389104

M. S. Putcha, Minimal sequences in semigroups, Trans. Amer. Math. Soc. 189 (1974), 93-106. DOI: 10.1090/S0002-9947-1974-0338233-4

M. S. Putcha and J. Weissglass, A semilattice decomposition into semigroups having at most one idempotent, Pacific J. Math. 39 (1971), no. 1, 225-228. DOI: 10.2140/pjm.1971.39.225

R. Sulka, The maximal semilattice decomposition of a semigroup, radicals and nilpotency, Mat. Cas. Slovensk. Akad. Vied 20 (1970), no. 3, 172-180.

T. Tamura, The theory of construction of finite semigroups, I, Osaka Math. J. 8 (1956), 243-261.

T. Tamura, Semilattice congruences viewed from quasi-orders, Proc. Amer. Math. Soc. 41 (1973), no. 1, 75-79. DOI: 10.1090/S0002-9939-1973-0333048-X

T. Tamura, Semilattice indecomposable semigroups with a unique idempotent, Semigroup Forum 24 (1982), no. 1, 77-82. DOI: 10.1007/BF02572757

T. Tamura and J. Shafer, Another proof of two decomposition theorems of semigroups, Proc. Japan Acad. 42 (1966), no. 7, 685-687. DOI: 10.3792/pja/1195521874

T. Tamura and N. Kimura, On decompositions of a commutative semigroup, Kodai Math. Sem. Rep. 6 (1954), no. 4, 109-112. DOI: 10.2996/kmj/1138843534