Voir la notice de l'article provenant de la source Cambridge University Press
Koubek, V.; Sichler, J. Universal varieties of distributive double p-algebras. Glasgow mathematical journal, Tome 26 (1985) no. 2, pp. 121-131. doi: 10.1017/S0017089500005887
@article{10_1017_S0017089500005887,
author = {Koubek, V. and Sichler, J.},
title = {Universal varieties of distributive double p-algebras},
journal = {Glasgow mathematical journal},
pages = {121--131},
year = {1985},
volume = {26},
number = {2},
doi = {10.1017/S0017089500005887},
url = {http://geodesic.mathdoc.fr/articles/10.1017/S0017089500005887/}
}
TY - JOUR AU - Koubek, V. AU - Sichler, J. TI - Universal varieties of distributive double p-algebras JO - Glasgow mathematical journal PY - 1985 SP - 121 EP - 131 VL - 26 IS - 2 UR - http://geodesic.mathdoc.fr/articles/10.1017/S0017089500005887/ DO - 10.1017/S0017089500005887 ID - 10_1017_S0017089500005887 ER -
[1] 1.Adams, M. E., Koubek, V. and Sichler, J., Homomorphisms and endomorphisms of distributive lattices, to appear in Houston J. Math. Google Scholar
[2] 2.Adams, M. E., Koubek, V. and Sichler, J., Endomorphisms and homomorphisms of Heyting algebras, to appear in Algebra Universalis. Google Scholar
[3] 3.Adams, M. E. and Sichler, J., Endomorphism monoids of distributive double p-algebras, Glasgow Math. J. 20 (1979), 81–86. Google Scholar | DOI
[4] 4.Beazer, R., The determination congruence on double p-algebras, Algebra Universalis 6 (1976), 121–129. Google Scholar | DOI
[5] 5.Beazer, R., Personal communication (1983). Google Scholar
[6] 6.Davey, B., Subdirectly irreducible distributive double p-algebras, Algebra Universalis 8 (1978), 73–88. Google Scholar | DOI
[7] 7.Davey, B. A. and Duffus, D., Exponentiation and duality, Ordered Sets, NATO Advanced Study Institutes Series 83 (D. Reidel, 1982), 43–95. Google Scholar | DOI
[8] 8.Hedrlin, Z. and Pultr, A., On rigid undirected graphs, Canad. J. Math. 18 (1966), 1237–1242. Google Scholar | DOI
[9] 9.Hedrlín, Z. and Pultr, A., On full embeddings of categories of algebras, Illinois J. Math. 10 (1966), 392–406. Google Scholar | DOI
[10] 10.Hedrlin, Z. and Sichler, J., Any boundable binding category contains a proper class of mutually disjoint copies of itself, Algebra Universalis 1 (1971), 97–103. Google Scholar | DOI
[11] 11.Jónsson, B., Algebras whose congruence lattices are distributive, Math. Scand. 21 (1967), 110–121. Google Scholar | DOI
[12] 12.Katriňák, T., The injective double Stone algebras, Algebra Universalis 4 (1974), 259–267. Google Scholar | DOI
[13] 13.Nachbin, L., Topology and Order (Van Nostrand, 1965). Google Scholar
[14] 14.Priestley, H. A., Representation of distributive lattices by means of ordered Stone spaces, Bull. London Math. Soc. 2 (1970), 186–190. Google Scholar | DOI
[15] 15.Priestley, H. A., Ordered topological spaces and the representation of distributive lattices, Proc. London Math. Soc. (3) 24 (1972), 507–530. Google Scholar | DOI
[16] 16.Priestley, H. A., The construction of spaces dual to pseudocomplemented distributive lattices, Quart. J. Math. Oxford Ser. (2) 26 (1975), 215–228. Google Scholar | DOI
[17] 17.Priestley, H. A., Ordered sets and duality for distributive lattices, Proc. Conf. on Ordered Sets and their Applications, Lyon (1982), to appear. Google Scholar
[18] 18.Pultr, A. and Trnková, V., Combinatorial, Algebraic and Topological Representations of Groups, Semigroups and Categories (North-Holland, 1980). Google Scholar
[19] 19.Varlet, J., A regular variety of type (2, 2, 1, 1, 0, 0), Algebra Universalis 2 (1972), 218–223. Google Scholar | DOI
Cité par Sources :