Sahlqvist formula

In modal logic, Sahlqvist formulas are a certain kind of modal formula with remarkable properties. The Sahlqvist correspondence theorem states that every Sahlqvist formula is canonical, and corresponds to a class of Kripke frames definable by a first-order formula.

Sahlqvist's definition characterizes a 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 [Chagrova 1991] (see the examples below). Hence Sahlqvist formulas define only a (decidable) subset of modal formulas with first-order correspondents.

Sahlqvist formulas are built up from implications, where the consequent is positive and the antecedent is of a restricted form.

• A boxed atom is a propositional atom preceded by a number (possibly 0) of boxes, i.e. a formula of the form ${\displaystyle \Box \cdots \Box p}$ (often abbreviated as ${\displaystyle \Box ^{i}p}$ for ${\displaystyle 0\leq i<\omega }$).
• A Sahlqvist antecedent is a formula constructed using ∧, ∨, and ${\displaystyle \Diamond }$ from boxed atoms, and negative formulas (including the constants ⊥, ⊤).
• 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 ${\displaystyle \Box }$ (unrestricted), and using ∨ on formulas with no common variables.

${\displaystyle p\rightarrow \Diamond p}$

Its first-order corresponding formula is ${\displaystyle \forall x\;Rxx}$, and it defines all reflexive frames

${\displaystyle p\rightarrow \Box \Diamond p}$

Its first-order corresponding formula is ${\displaystyle \forall x\forall y[Rxy\rightarrow Ryx]}$, and it defines all symmetric frames

${\displaystyle \Diamond \Diamond p\rightarrow \Diamond p}$ or ${\displaystyle \Box p\rightarrow \Box \Box p}$

Its first-order corresponding formula is ${\displaystyle \forall x\forall y\forall z[(Rxy\land Ryz)\rightarrow Rxz]}$, and it defines all transitive frames

${\displaystyle \Diamond p\rightarrow \Diamond \Diamond p}$ or ${\displaystyle \Box \Box p\rightarrow \Box p}$

Its first-order corresponding formula is ${\displaystyle \forall x\forall y[Rxy\rightarrow \exists z(Rxz\land Rzy)]}$, and it defines all dense frames

${\displaystyle \Box p\rightarrow \Diamond p}$

Its first-order corresponding formula is ${\displaystyle \forall x\exists y\;Rxy}$, and it defines all right-unbounded frames (also called serial)

${\displaystyle \Diamond \Box p\rightarrow \Box \Diamond p}$

Its first-order corresponding formula is ${\displaystyle \forall x\forall x_{1}\forall z_{0}[Rxx_{1}\land Rxz_{0}\rightarrow \exists z_{1}(Rx_{1}z_{1}\land Rz_{0}z_{1})]}$, and it is the Church–Rosser property.

${\displaystyle \Box \Diamond p\rightarrow \Diamond \Box p}$

This is the McKinsey formula; it does not have a first-order frame condition.

${\displaystyle \Box (\Box p\rightarrow p)\rightarrow \Box p}$

The Löb axiom is not Sahlqvist; again, it does not have a first-order frame condition.

${\displaystyle (\Box \Diamond p\rightarrow \Diamond \Box p)\land (\Diamond \Diamond q\rightarrow \Diamond q)}$

The conjunction of the McKinsey formula and the (4) axiom has a first-order frame condition (the conjunction of the transitivity property with the property ${\displaystyle \forall x[\forall y(Rxy\rightarrow \exists z[Ryz])\rightarrow \exists y(Rxy\wedge \forall z[Ryz\rightarrow z=y])]}$) but is not equivalent to any Sahlqvist formula.

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 basic elementary class of frames the axiom defines. This result comes from the Sahlqvist completeness theorem [Modal Logic, Blackburn et al., Theorem 4.42]. 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 [Modal Logic, Blackburn et al., Theorem 3.59].

• Patrick Blackburn, Maarten de Rijke, Yde Venema, 2010. Modal logic (4. print. with corr.). Cambridge Univ. Press.
• L. A. Chagrova, 1991. An undecidable problem in correspondence theory. Journal of Symbolic Logic 56:1261–1272.
• Marcus Kracht, 1993. How completeness and correspondence theory got married. In de Rijke, editor, Diamonds and Defaults, pages 175–214. Kluwer.
• Henrik Sahlqvist, 1975. Correspondence and completeness in the first- and second-order semantics for modal logic. In Proceedings of the Third Scandinavian Logic Symposium. North-Holland, Amsterdam.