TY - GEN
T1 - Universal stone duality via the concept of topological dualizability and its applications to many-valued logic
AU - Maruyama, Yoshihiro
N1 - Publisher Copyright:
© 2020 IEEE.
PY - 2020/7
Y1 - 2020/7
N2 - We propose the concept of topological dualizability as the condition of possibility of Stone duality, and thereby give a non-Hausdorff extension of the primal duality theorem in natural duality theory in universal algebra. The primal duality theorem is a vast generalization of the classic Stone duality for Boolean algebras, telling that any varieties generated by functionally complete algebras, such as the algebras of Emil Post's finite-valued logics, are categorically equivalent to zero-dimensional compact Hausdorff spaces. Here we show a non-Hausdorff extension of primal duality: any varieties generated by certain weakly functionally complete or topologically dualizable algebras are categorically dually equivalent to coherent spaces, a special class of compact sober spaces. This generalizes the Stone duality for distributive lattices and Heyting algebras (as a subclass of distributive lattices) in the spirit of primal duality theory. And we give applications of the general theorem to algebras of Łukasiewicz many-valued logics. The concept of topological dualizability is arguably the key to the universal algebraic unification of Stone-type dualities; in the present paper, we take the first steps in demonstrating this thesis.
AB - We propose the concept of topological dualizability as the condition of possibility of Stone duality, and thereby give a non-Hausdorff extension of the primal duality theorem in natural duality theory in universal algebra. The primal duality theorem is a vast generalization of the classic Stone duality for Boolean algebras, telling that any varieties generated by functionally complete algebras, such as the algebras of Emil Post's finite-valued logics, are categorically equivalent to zero-dimensional compact Hausdorff spaces. Here we show a non-Hausdorff extension of primal duality: any varieties generated by certain weakly functionally complete or topologically dualizable algebras are categorically dually equivalent to coherent spaces, a special class of compact sober spaces. This generalizes the Stone duality for distributive lattices and Heyting algebras (as a subclass of distributive lattices) in the spirit of primal duality theory. And we give applications of the general theorem to algebras of Łukasiewicz many-valued logics. The concept of topological dualizability is arguably the key to the universal algebraic unification of Stone-type dualities; in the present paper, we take the first steps in demonstrating this thesis.
KW - Functional completeness
KW - Many-valued logic
KW - Non-Hausdorff duality
KW - Primal duality theory
KW - Łukasiewicz logic
UR - http://www.scopus.com/inward/record.url?scp=85090497456&partnerID=8YFLogxK
U2 - 10.1109/FUZZ48607.2020.9177848
DO - 10.1109/FUZZ48607.2020.9177848
M3 - Conference contribution
T3 - IEEE International Conference on Fuzzy Systems
BT - 2020 IEEE International Conference on Fuzzy Systems, FUZZ 2020 - Proceedings
PB - Institute of Electrical and Electronics Engineers Inc.
T2 - 2020 IEEE International Conference on Fuzzy Systems, FUZZ 2020
Y2 - 19 July 2020 through 24 July 2020
ER -