Provability logic is a modal logic, in which the box (or "necessity") operator is interpreted as 'it is provable that'. The point is to capture the notion of a proof predicate of a reasonably rich formal theory, such as Peano arithmetic.

Examples

There are a number of provability logics, some of which are covered in the literature mentioned in § References. The basic system is generally referred to as GL (for GödelLöb) or L or K4W (W stands for well-foundedness). It can be obtained by adding the modal version of Löb's theorem to the logic K (or K4).

Namely, the axioms of GL are all tautologies of classical propositional logic plus all formulas of one of the following forms:

  • Distribution axiom: □(pq) → (□p → □q);
  • Löb's axiom: □(□pp) → □p.

And the rules of inference are:

  • Modus ponens: From pq and p conclude q;
  • Necessitation: From p conclude p.

History

The GL model was pioneered by Robert M. Solovay in 1976. Since then, until his death in 1996, the prime inspirer of the field was George Boolos. Significant contributions to the field have been made by Sergei N. Artemov, Lev Beklemishev, Giorgi Japaridze, Dick de Jongh, Franco Montagna, Giovanni Sambin, Vladimir Shavrukov, Albert Visser and others.

Generalizations

Interpretability logics and Japaridze's polymodal logic present natural extensions of provability logic.

See also

References


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