A system of fuzzy constructive logic is considered in which the truth values are partially ordered. The notion of algorithmic scale of truth values (shortly, A-scale) is introduced; and on the base of it logical system of generalized fuzzy constructive logic is developed. The classes of identically true predicate formulas in strong and weak sense concerning a given A-scale are introduced. It is proved that any predicate formula of some kind deducible in the constructive (intuitionistic) predicate calculus is identically true in the strong sense concerning any A-scale. From the other side it is proved that some predicate formulas (which are identically true from the classical point of view) are not identically true in the weak sense concerning any A-scale.
"GITUTYUN" PUBLISHING HOUSE OF NAS RA
UDC 621.39.1:519.34 ; oai:noad.sci.am:135785
National Academy of Sciences of Armenia
Mar 3, 2021
Jul 15, 2020
21
https://noad.sci.am/publication/149312
Edition name | Date |
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И. Д. Заславский, 2015, Обобщенная нечеткая конструктивная логика | Mar 3, 2021 |