Intermediate logic mathematical logic , a superintuitionistic logic is a propositional logic extending intuitionistic logic . Classical logic is the strongest consistent superintuitionistic logic; thus, consistent superintuitionistic logics are called intermediate logics .Definition A superintuitionistic logic is a set L of propositional formulas in a countable set ofp i There exists a continuum of different intermediate logics. Specific intermediate logics are often constructed by adding one or more axioms to intuitionistic logic, or by a semantical description . Examples of intermediate logics include: intuitionistic logic classical logic : = = the logic of the weak excluded middle : Gödel–Dummett logic : Kreisel–Putnam logic : Medvedev's logic of finite problems : defined semantically as the logic of all frames of the form for finite sets X , not known to be recursively axiomatizable realizability logics Scott's logic : Smetanich's logic : logics of bounded cardinality : logics of bounded width, also known as the logic of bounded anti-chains : logics of bounded depth : logics of bounded top width : logics of bounded branching : Gödel n -valued logics : LC + BC n −1LC + BD n −1 complete lattice with intuitionistic logic as the bottom and the inconsistent logic or classical logic as the top. Classical logic is the only coatom in the lattice of superintuitionistic logics; the lattice of intermediate logics also has a unique coatom, namely SmL .Kripke semantics . For example, Gödel–Dummett logic has a simple semantic characterization in terms of total orders.Semantics Given a Heyting algebra H , the set of propositional formulas that are valid in H is an intermediate logic. Conversely, given an intermediate logic it is possible to construct its Lindenbaum algebra which is a Heyting algebra.Kripke frame F is a partially ordered set , and a Kripke model M is a Kripke frame with valuation such that is an upper subset of F . The set of propositional formulas that are valid in F is an intermediate logic. Given an intermediate logic L it is possible to construct a Kripke model M such that the logic of M is L . A Kripke frame with this property may not exist, but a general frame always does.Let A be a propositional formula . The Gödel–Tarski translation of A is defined recursively as follows:M is a modal logic extending S4 then ρM = is a superintuitionistic logic, and M is called a modal companion of ρM . In particular:IPC = ρS4 KC = ρS4.2 LC = ρS4.3 CPC = ρS5 L there are many modal logics M such that L = ρM .
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