Homomorphisms and Endomorphisms in Varieties of Pseudocomplemented Distributive Lattices (with Applications to Heyting Algebras)
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Publication:3674729
DOI10.2307/1999472zbMath0523.06015OpenAlexW2070803019MaRDI QIDQ3674729
No author found.
Publication date: 1984
Full work available at URL: https://doi.org/10.2307/1999472
endomorphism monoidStone algebrasvariety of Heyting algebraslattice of varieties of pseudocomplemented distributive lattices
Heyting algebras (lattice-theoretic aspects) (06D20) Pseudocomplemented lattices (06D15) Automorphisms and endomorphisms of algebraic structures (08A35) Varieties of lattices (06B20)
Related Items (12)
Kleene algebras are almost universal ⋮ De Morgan algebras are universal ⋮ Categorical universality of regular double p-algebras ⋮ Endomorphism monoids of bands ⋮ Finitely generated relatively universal varieties of Heyting algebras ⋮ Homomorphisms of distributive p-algebras with countably many minimal prime ideals ⋮ Unnamed Item ⋮ A Construction for Pseudocomplemented Semilattices and Two Applications ⋮ Isomorphism Universal Varieties of Heyting Algebras ⋮ Unnamed Item ⋮ Endomorphisms and homomorphisms of Heyting algebras ⋮ Equimorphy in varieties of distributive double p-algebras
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