Weakly associative lattices with congruence extension property
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Publication:1212952
DOI10.1007/BF02485719zbMath0295.06004OpenAlexW2069372027MaRDI QIDQ1212952
Publication date: 1974
Published in: Algebra Universalis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/bf02485719
Related Items
Bjarni Jónsson's contributions in algebra, Uniform congruence schemes, Weakly idempotent lattices and bilattices, non-idempotent Plonka functions., Prime factorization, algebraic extension and construction of weakly associative lattices, A set-theoretical representation for weakly idempotent lattices and interlaced weakly idempotent bilattices, A representation theory for the variety generated by the triangle, Hyperidentities of weakly idempotent lattices.
Cites Work
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- A nonassociative extension of the class of distributive lattices
- A proof of Baker's finite-base theorem on equational classes generated by finite elements of congruence distributive varieties
- Trellis theory
- Primitive Satisfaction and Equational Problems for Lattices and Other Algebras
- Some examples of weakly associative lattices
- Algebras Whose Congruence Lattices are Distributive.
