The Endomorphism Kernel Property in Finite Distributive Lattices and de Morgan Algebras
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Publication:3158206
DOI10.1081/AGB-120037216zbMath1060.06018MaRDI QIDQ3158206
H. J. Silva, Jie Fang, T. S. Blyth
Publication date: 21 January 2005
Published in: Communications in Algebra (Search for Journal in Brave)
Structure and representation theory of distributive lattices (06D05) Lattices and duality (06D50) De Morgan algebras, ?ukasiewicz algebras (lattice-theoretic aspects) (06D30)
Related Items (13)
Meet infinite distributivity for congruence lattices of direct sums of algebras ⋮ The strong endomorphism kernel property for modular p-algebras and for distributive lattices ⋮ Unnamed Item ⋮ The strong endomorphism kernel property in double MS-algebras ⋮ Strong endomorphism kernel property for finite Brouwerian semilattices and relative Stone algebras ⋮ The Strong Endomorphism Kernel Property in Ockham Algebras ⋮ Semilattices with the strong endomorphism kernel property. ⋮ Some monounary algebras with EKP ⋮ An extended Ockham algebra with endomorphism kernel property ⋮ Finite abelian groups with the strong endomorphism kernel property ⋮ The balanced pseudocomplemented Ockham algebras with the strong endomorphism kernel property ⋮ Automata all of whose congruences are inner ⋮ Ockham Algebras—An Urquhart Legacy
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