The monadic hybrid calculus

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Journal of Applied Non-Classical Logics 27 (1-2):33-49 (2017)
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Abstract

We present the design goals and metatheory of the Monadic Hybrid Calculus, a new formal system that has the same power as the Monadic Predicate Calculus. MHC allows quantification, including relative quantification, in a straightforward way without the use of bound variables, using a simple adaptation of modal logic notation. Thus “all Greeks are mortal” can be written as [G]M. MHC is also ‘hybrid’ in that it has individual constants, which allow us to formulate statements about particular individuals. Thus “Socrates is Athenian and mortal” can be formalised as s.For our proof system, we use a simple adaptation of Beth-style tableaus. The availability of individual constants eliminates the need for labelled deduction.We discuss first the pragmatic and pedagogical advantages of MHC. Then we present the metatheory: formal syntax, semantics, proof rules, soundness, completeness and expressive equivalence with the Monadic Predicate Calculus.

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10.1080/11663081.2017.1368844

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First-order logic.Raymond Merrill Smullyan - 1968 - New York [etc.]: Springer Verlag.
The Logic Book.Merrie Bergmann, James Moor, Jack Nelson & Merrie Bergman - 1982 - Journal of Symbolic Logic 47 (4):915-917.
Hybrid Logic and its Proof-Theory.Torben Braüner - 2010 - Dordrecht and New York: Springer.
The logic book.Merrie Bergmann - 2003 - Boston, Mass.: McGraw-Hill. Edited by James Moor & Jack Nelson.

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