On Boolean ranges of Banaschewski functions
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Publication:1646621
DOI10.1007/S00012-018-0489-9zbMath1469.06010OpenAlexW2797580050WikidataQ114586390 ScholiaQ114586390MaRDI QIDQ1646621
Publication date: 25 June 2018
Published in: Algebra Universalis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00012-018-0489-9
latticeclosure operatormodularadjunctioncomplementedBooleanBanaschewski functionSchmidt's construction
Structure theory of lattices (06B05) Complemented modular lattices, continuous geometries (06C20) Galois correspondences, closure operators (in relation to ordered sets) (06A15) Other generalizations of distributive lattices (06D75)
Cites Work
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- A non-coordinatizable sectionally complemented modular lattice with a large Jónsson four-frame
- Coordinatization of lattices by regular rings without unit and Banaschewski functions
- Every finite distributive lattice is the congruence lattice of some modular lattice
- A lattice construction and congruence-preserving extensions
- A new lattice construction: The box product
- Tensor products of semilattices with zero, revisited
- Proper congruence-preserving extensions of lattices
- Totalgeordnete Moduln
- Representations of Complemented Modular Lattices
- Flat semilattices
- Tensor Products and Transferability of Semilattices
- On the independence theorem of related structures for modular (arguesian) lattices
- Galois Connexions
- The \(M_3[D\) construction and \(n\)-modularity]
- A survey of tensor products and related constructions in two lectures
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