The class of Arguesian lattices is self-dual
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Publication:2560436
DOI10.1007/BF02945054zbMath0261.06008OpenAlexW2005078864MaRDI QIDQ2560436
Publication date: 1972
Published in: Algebra Universalis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/bf02945054
Related Items
Two notes on the Arguesian identity ⋮ A perspective on algebraic representations of lattices ⋮ Jónsson's contributions to lattice theory ⋮ Representations of additive relation algebras by modules ⋮ A selfdual Arguesian inequality ⋮ On the Arithmetic of Projective Coordinate Systems ⋮ Varieties of Boolean inverse semigroups ⋮ Congruences, equational theories and lattice representations ⋮ Congruence varieties ⋮ The Coordinatization of Arguesian Lattices ⋮ Tribute to Bjarni Jónsson ⋮ Congruence modularity implies the Arguesian identity ⋮ A duality principle for lattices and categories of modules ⋮ Two weaker variants of congruence permutability for monoid varieties ⋮ Small non-Arguesian lattices ⋮ Proof theory for linear lattices ⋮ A structural characterization of non-Arguesian lattices
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