Groups of complexes of a representable lattice-ordered group
Glasgow mathematical journal, Tome 19 (1978) no. 2, pp. 135-139

Voir la notice de l'article provenant de la source Cambridge University Press

In 1954 N. Kimura proved that each idempotent in a semigroup is contained in a unique maximal subgroup of the semigroup and that distinct maximal subgroups are disjoint [13] (or see [6, pp. 21–23]). This generalized earlier results of Schwarz [14] and Wallace [15]. These maximal subgroups are important in the study of semigroups. If G is a group, then the collection S(G) of nonempty complexes of G is a semigroup and it is natural to inquire what properties of G are inherited by the maximal subgroups of S(G). There seems to be very little literature devoted to this subject. In [5, Theorem 2], with certain hypotheses placed on an idempotent, it was shown that if G is a lattice-ordered group (“1-group”) then a maximal subgroup of S(G) containing an idempotent satisfying these conditions admits a natural lattice-order. The main result of this note (Theorem 1) is that if Gis a representable 1-group and E is a normal idempotent of S(G) and a dual ideal of the lattice G, then the maximal subgroup of S(G) containing E admits a representable lattice-order.
Byrd, R. D.; Lloyd, J. T.; Stepp, J. W. Groups of complexes of a representable lattice-ordered group. Glasgow mathematical journal, Tome 19 (1978) no. 2, pp. 135-139. doi: 10.1017/S0017089500003529
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[1] 1.Birkhoff, G., Lattice Theory (Amer. Math. Soc., 1967). Google Scholar

[2] 2.Bernau, S. J., Orthocompletions of lattice groups, Proc. London Math. Soc. 16 (1966), 107–130. Google Scholar | DOI

[3] 3.Byrd, R. D., Complete distributivity in lattice-ordered groups, Pacific J. Math. 20 (1967), 423–432. Google Scholar | DOI

[4] 4.Byrd, R. D., Lloyd, J. T. and Stepp, J. W., Groups of complexes of a group, J. Natur. Sci. and Math. 15 (1975), 83–87. Google Scholar

[5] 5.Byrd, R. D., Lloyd, J. T. and Stepp, J. W., Groups of complexes of a lattice-ordered group, Sym. Math. 21 (1977) 525–528. Google Scholar

[6] 6.Clifford, A. H. and Preston, G. B., The algebraic theory of semigroups Vol. I, Amer. Math. Soc. Mathematical Surveys 7 (Providence, R.I., 1961). Google Scholar | DOI

[7] 7.Conrad, P. F., Some structure theorems for lattice-ordered groups, Trans. Amer. Math. Soc. 99 (1961), 212–240. Google Scholar | DOI

[8] 8.Conrad, P. F., The relationship between the radical of a lattice-ordered group and complete distributivity, Pacific J. Math. 14 (1964), 493–499. Google Scholar | DOI

[9] 9.Conrad, P. F., Archimedean extensions of lattice-ordered groups, J. Indian Math. Soc. 30 (1966), 131–160. Google Scholar

[10] 10.Conrad, P. F., Lattice-ordered groups, Lecture Notes (Tulane University, 1970). Google Scholar

[11] 11.Conrad, P. F., Epi-Archimedean groups, Czechoslovak Math. J. 24 (1974), 192–218. Google Scholar | DOI

[12] 12.Fuchs, L., Partially ordered algebraic systems (Pergamon Press, 1963). Google Scholar

[13] 13.Kimura, N., Maximal subgroups of a semigroup, Kōdai Math. Sem. Rep. 1954 (1954), 85–88. Google Scholar

[14] 14.Schwarz, S., Zur Theorie der Halbgruppen (Slovakian, German summary), Sbornik prac Prirodovedekej Fakulty Slovenskej University v Bratislave No 6 (1943). Google Scholar

[15] 15.Wallace, A. D., A note on mobs II, An. Acad. Brasil Ci. 25 (1953), 335–336. Google Scholar

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