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Endomorphism monoids of distributive double p-algebras

Published online by Cambridge University Press:  18 May 2009

M. E. Adams  and
J. Sichler
M. E. Adams
Affiliation:
University of Manitoba, Winnipeg, Manitoba, Canada R3T 2N2
J. Sichler
Affiliation:
University of Manitoba, Winnipeg, Manitoba, Canada R3T 2N2
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A distributive p-algebra is an algebra 〈L; ∨, ∧, *, 0, 1〉 for which 〈L, ∨, ∧, 0, 1〉 is a bounded distributive lattice and * is a unary operation on L such that ax = 0 if and only if xa* (i.e. a pseudocomplementation). A distributive double p-algebra is an algebra 〈L; ∨, ∧, *, +, 0, 1〉 in which the deletion of + gives a distributive p-algebra and the deletion of * gives a dual distributive p-algebra, that is a ∨ (x = 1 if and only if xa+.

Type
Research Article
Information
Glasgow Mathematical Journal , Volume 20 , Issue 1 , January 1979 , pp. 81 - 86
Copyright
Copyright © Glasgow Mathematical Journal Trust 1979

References

REFERENCES

1.Beazer, R., The determination congruence on double p-algebras, Algebra Universalis 6 (1976), 121129.Google Scholar
2.Davey, B. A., Subdirectly irreducible distributive double p-algebras, preprint.Google Scholar
3.Dushnik, B. and Miller, E. W., Partially ordered sets, Amer. J. Math. 63 (1941), 601610.CrossRefGoogle Scholar
4.Hedrlín, Z. and Sichler, J., Any boundable binding category contains a proper class of mutually disjoint copies of itself, Algebra Universalis 1 (1971), 97103.CrossRefGoogle Scholar
5.Katriňák, T., The structure of distributive double p-algebras. Regularity and congruences, Algebra Universalis 3 (1973), 238246.CrossRefGoogle Scholar
6.Pinus, A. G., On the number of pairwise noncomparable order types, Siberian Math. J. 14 (1973), 164167.CrossRefGoogle Scholar
7.Pinus, A. G., A letter to the editor, Siberian Math. J. 17 (1977), 543.CrossRefGoogle Scholar
8.Priestley, H. A., Representation of distributive lattices by means of ordered Stone spaces, Bull. London Math. Soc. 2 (1970), 186190.CrossRefGoogle Scholar
9.Priestley, H. A., Ordered topological spaces and the representation of distributive lattices, Proc. London Math. Soc. (3) 24 (1972), 507530.Google Scholar
10.Priestley, H. A., The construction of spaces dual to pseudocomplemented distributive lattices, Quart. J. Math. Oxford Ser. (2) 26 (1975), 215228.Google Scholar
11.Rotman, B., On the comparison of order types, Ada Math. Acad. Sci. Hungar. 19 (1968), 311328.Google Scholar
12.Sichler, J., Testing categories and strong universality, Canad. J. Math. 25 (1973), 370385.Google Scholar