JOURNAL ARTICLE
Equimorphy in varieties of double Heyting algebras
Year: 1998 Journal: Colloquium Mathematicum Vol: 77 (1)Pages: 41-58 Publisher: Polish Academy of Sciences
Abstract
We show that any finitely generated variety V of double Heyting algebras is finitely determined, meaning that for some finite cardinal n(V), any class $\Cal S$ ⊆ V consisting of algebras with pairwise isomorphic endomorphism monoids has fewer than n(V) pa
Keywords:
Mathematics Endomorphism Finitely-generated abelian group Variety (cybernetics) Heyting algebra Pure mathematics Class (philosophy) Pairwise comparison Algebra over a field
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Topics
Rings, Modules, and Algebras
Physical Sciences → Mathematics → Algebra and Number Theory
Advanced Algebra and Logic
Physical Sciences → Computer Science → Computational Theory and Mathematics
Advanced Topology and Set Theory
Physical Sciences → Mathematics → Geometry and Topology
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