References
A. Day,A simple solution to the word problem for lattices, Canad. Math. Bull.13 (1970), 253–254.
A. Day,Splitting algebras and a new notion of projectivity, Algebra Univ.5 (1975), 153–162.
A. Day,Splitting lattices and congruence modularity, Contributions to Universal Algebra (Proc. Conf. Szeged, 1975), Coll. Math. Soc. J. Bolyai, vol. 17, North-Holland, Amsterdam, (1977), 57–71.
R. A. Dean,Free lattices generated by partially ordered sets and preserving bounds, Canad. J. Math.16 (1964), 136–148.
G.Grátzer,General Lattice Theory, Birkhäuser Verlag, 1978.
B. Jónsson,Algebras whose congruence lattices are distributive, Math. Scand.21 (1967), 110–121.
T. Katriňák,Primitive Klassen von modularen S-Algebren, J. reine angew. Math.261 (1973), 55–70.
T. Katriňák,Subdirectly irreducible modular p-algebras, Algebra Univ.2 (1972), 166–173.
T. Katriňák,The cardinality of the lattice of all equational classes of p-algebras, Algebra Univ.3 (1973), 328–329.
T. Katriňák,Varieties of modular p-algebras, Colloq. Math.29 (1974), 179–184.
T. Katriňák,Subdirectly irreducible p-algebras, Algebra Univ.9 (1979), 116–126.
T.Katriňák,Free p-algebras, Algebra Univ. (to appear)
A. Kostinsky,Protective lattices and bounded homomorphisms, Pacific J. Math.40 (1972), 111–119.
H. Lakser,The structure of pseudocomplemented distributive lattices. I. Subdirect decomposition, Trans. Amer. Math. Soc.156 (1971), 335–342.
H. Lakser,Equational classes of lattices with pseudocomplementation, Algebra Univ.8 (1978), 395.
K. B. Lee,Equational classes of distributive pseudo-complemented lattices, Canad. J. Math.22 (1970), 881–891.
R. McKenzie,Equational bases and nonmodular lattice varieties, Trans. Amer. Math. Soc.174 (1972), 1–43.
P. Ribenboim,Characterization of the sup-complement in a distributive lattice with last element, Summa Brasil. Math.2 (1949), 43–49.
R.Sikorski,Boolean algebras, Springer, 1964.
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Katriňák, T. Splittingp-algebras. Algebra Universalis 18, 199–224 (1984). https://doi.org/10.1007/BF01198528
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DOI: https://doi.org/10.1007/BF01198528