Sahlqvist formula modal logic , Sahlqvist formulasSahlqvist correspondence theorem states that every Sahlqvist formula is canonical , and corresponds to a first-order definable class of Kripke frames . decidable set of modal formulas with first-order correspondents. Since it is undecidable, by Chagrova's theorem, whether an arbitrary modal formula has a first-order correspondent, there are formulas with first-order frame conditions that are not Sahlqvist . Hence Sahlqvist formulas define only a subset of modal formulas with first-order correspondents.Definition Sahlqvist formulas are built up from implications , where the consequent is positive A boxed atom A Sahlqvist antecedent is a formula constructed using ∧ , ∨, and from boxed atoms, and negative formulas. A Sahlqvist implication is a formula A → B , where A is a Sahlqvist antecedent, and B is a positive formula . A Sahlqvist formula is constructed from Sahlqvist implications using ∧ and , and using ∨ on formulas with no common variables.Examples of Sahlqvist formulas Examples of non-Sahlqvist formulas ; Kracht's theorem When a Sahlqvist formula is used as an axiom in a normal modal logic , the logic is guaranteed to be complete with respect to the elementary class of frames the axiom defines. This result comes from the Sahlqvist completeness theorem . But there is also a converse theorem , namely a theorem that states which first-order conditions are the correspondents of Sahlqvist formulas. Kracht's theorem states that any Sahlqvist formula locally corresponds to a Kracht formula; and conversely, every Kracht formula is a local first-order correspondent of some Sahlqvist formula which can be effectively obtained from the Kracht formula .
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