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α-Representable coproducts of distributive lattices

Published online by Cambridge University Press:  20 January 2009

Fawzi M. Yaqub
Fawzi M. Yaqub
Affiliation:
Mathematics Department, American University of Beirut, Lebanon
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There are a number of classes of distributive lattices whose members can be characterised as the coproduct A * L of suitable distributive lattices A and L. For example, Post algebras [1], pseudo-Post algebras [4], Post Lalgebras ([6], [8[9]) and the lattices [D]n of [4]. Moreover, the α-completeness and α-representability of some(though not all) of these algebras have been investigated in [7], [2], [6], and [10].

Type
Research Article
Information
Proceedings of the Edinburgh Mathematical Society , Volume 25 , Issue 3 , October 1982 , pp. 229 - 235
Copyright
Copyright © Edinburgh Mathematical Society 1982

References

REFERENCES

1.Balbes, R. and Dwinger, Ph., Distributive Lattices (University of Missouri Press, Columbia, (1974)Google Scholar
2.Dwinger, Ph., Notes on Post algebras I and II, Indag. Math. 28 (1966), 462478.CrossRefGoogle Scholar
3.Dwinger, Ph., Introduction to Boolean algebras (Physica. Verlag, Wurzburg, second edition, 1971).Google Scholar
4.Rousseau, G., Post algebras and pseudo-Post algebras, Fund. Math. 67 (1970), 133145.CrossRefGoogle Scholar
5.Sikorski, R., Products of abstract algebras, Fund. Math. 39 (1952), 211228.CrossRefGoogle Scholar
6.Speed, T. P., A note on Post algebras, Coll. Math. 24 (1971), 3744.CrossRefGoogle Scholar
7.Traczyk, T., A generalization of the Loomis-Sikorski theorem, Colloq. Math. 12 (1964), 156161.CrossRefGoogle Scholar
8.Yaqub, F. M., Free Post L-algebras, Algebra Universalis 9 (1979), 4553.CrossRefGoogle Scholar
9.Yaqub, F. M., Equationally definable Post L-algebras, Algebra Universalis (to appear).Google Scholar
10.Yaqub, F. M., Representation of Post L-algebras by rings of sets, Proc. Algebra and Geometry Conference, Kuwait University (to appear).Google Scholar