论文信息 - Further properties of lattices of equational theories - 字舞流文

Further properties of lattices of equational theories

William A. Lampe

[1] Pavel Pudlák. A new proof of the congruence lattice representation theorem , 1976 .

[2] George Gratzer,et al. Universal Algebra , 1979 .

[3] Stanley Burris,et al. Embedding the dual ofΠ∞ in the lattice of equational classes of semigroups , 1971 .

[4] Marcel Erné. Weak distributive laws and their role in lattices of congruences and equational theories , 1988 .

[5] CONGRUENCE LATTICES OF ALGEBRAS OF FIXED SIMILARITY TYPE, I , 1979 .

[6] Ralph McKenzie,et al. Definability in lattices of equational theoris , 1971 .

[7] William A. Lampe. A property of the lattice of equational theories , 1986 .

[8] Jaroslav Ježek. The lattice of equational theories. Part I: Modular elements , 1981 .

[9] P. M. Whitman,et al. Lattices, equivalence relations, and subgroups , 1946 .

[10] Ralph McKenzie,et al. Finite forbidden lattices , 1983 .

[11] Alan Day,et al. A Characterization of Identities Implying Congruence Modularity I , 1980, Canadian Journal of Mathematics.

[12] B. Jonnson. Algebras Whose Congruence Lattices are Distributive. , 1967 .

[13] George F. McNulty,et al. Structural diversity in the lattice of equational theories , 1981 .

[14] J. Ježek. Intervals in the lattice of varieties , 1976 .

[15] Stanley Burris,et al. Embedding the dual of _{} in the lattice of equational classes of commutative semigroups , 1971 .