Homomorphisms and principal congruences of bounded lattices. II. Sketching the proof for sublattices
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Publication:1686323
DOI10.1007/S00012-017-0461-0zbMath1420.06010OpenAlexW2766655288MaRDI QIDQ1686323
Publication date: 21 December 2017
Published in: Algebra Universalis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00012-017-0461-0
Related Items (5)
Some preliminary results on the set of principal congruences of a finite lattice ⋮ Representing an isotone map between two bounded ordered sets by principal lattice congruences ⋮ Homomorphisms and principal congruences of bounded lattices. III. The independence theorem ⋮ On the set of principal congruences in a distributive congruence lattice of an algebra ⋮ On the largest numbers of congruences of finite lattices
Cites Work
- Unnamed Item
- The ordered set of principal congruences of a countable lattice.
- The order of principal congruences of a bounded lattice
- Representing some families of monotone maps by principal lattice congruences
- Representing a monotone map by principal lattice congruences
- Some preliminary results on the set of principal congruences of a finite lattice
- Homomorphisms and principal congruences of bounded lattices. III. The independence theorem
- Cometic functors and representing order-preserving maps by principal lattice congruences
- The Congruences of a Finite Lattice
- An independence theorem for ordered sets of principal congruences and automorphism groups of bounded lattices
- Homomorphisms and principal congruences of bounded lattices I. Isotone maps of principal congruences
- Lattice Theory: Foundation
- Minimal representations of a finite distributive lattice by principal congruences of a lattice
- Lattice Theory: Special Topics and Applications
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