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In formal logic: Special systems of LPC
LPC-with-identity. The word “is” is not always used in the same way. In a proposition such as (1) “Socrates is snub-nosed,” the expression preceding the “is” names an individual and the expression following it stands for a property attributed to that individual. But, in a…
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In metalogic: Logic and metalogic
…may include as well the logic of identity, symbolized “=,” which takes the ordinary properties of identity as part of logic. In this sense Gottlob Frege achieved a formal calculus of logic as early as 1879. Sometimes logic is construed, however, as including also higher-order predicate calculi, which admit variables…
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In metalogic: Axioms and rules of inference
…to be those of the first-order predicate calculus with identity.
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In metalogic: Background and typical problems
…especially in that of the first-order predicate calculus with identity—i.e., in elementary logic. A first-order language is given by a collection S of symbols for relations, functions, and constants, which, in combination with the symbols of elementary logic, single out certain combinations of symbols as sentences. Thus, for example, in…
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In metalogic: Elementary logic
The development of model theory has led to a more general outlook that enabled the Swedish logician Per Lindström to prove in 1969 a general theorem to the effect that, roughly speaking, within a broad class of possible logics, elementary logic is the only one that satisfies the…
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In formal logic: Set theory
Sometimes LPC-with-identity is used, and there are then two primitive dyadic predicate constants (∊ and =). In some versions the variables x, y, … are taken to range only over sets or classes; in other versions they range over individuals as well. The special axioms vary,…
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