Provability logic is a
modal logic
Modal logic is a kind of logic used to represent statements about Modality (natural language), necessity and possibility. In philosophy and related fields
it is used as a tool for understanding concepts such as knowledge, obligation, and causality ...
, 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 . The basic system is generally referred to as GL (for
Gödel–
Löb) 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
The propositional calculus is a branch of logic. It is also called propositional logic, statement logic, sentential calculus, sentential logic, or sometimes zeroth-order logic. Sometimes, it is called ''first-order'' propositional logic to contra ...
plus all formulas of one of the following forms:
* Distribution axiom:
* Löb's axiom:
And the rules of inference are:
* ''Modus ponens'': From ''p'' → ''q'' and ''p'' conclude ''q'';
* Necessitation: From
''p'' conclude
.
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
*
Hilbert–Bernays provability conditions
*
Interpretability logic
*
Kripke semantics
Kripke semantics (also known as relational semantics or frame semantics, and often confused with possible world semantics) is a formal semantics for non-classical logic systems created in the late 1950s and early 1960s by Saul Kripke and André ...
*
Japaridze's polymodal logic
*
Löb's theorem
*
Doxastic logic
Doxastic logic is a type of logic concerned with reasoning about beliefs.
The term ' derives from the Ancient Greek (''doxa'', "opinion, belief"), from which the English term ''doxa'' ("popular opinion or belief") is also borrowed. Typically, a ...
References
*
George Boolos, '
The Logic of Provability''. Cambridge University Press, 1993.
Giorgi Japaridzeand Dick de Jongh
''The logic of provability'' In: Handbook of Proof Theory, S. Buss, ed. Elsevier, 1998, pp. 475–546.
*
Sergei N. Artemov an
Lev Beklemishev''Provability logic''
In: '
Handbook of Philosophical Logic
'', D. Gabbay and F. Guenthner, eds., vol. 13, 2nd ed., pp. 189–360. Springer, 2005.
* Per Lindström, ''Provability logic—a short introduction''. Theoria 62 (1996), pp. 19–61.
*Craig Smoryński, Self-reference and modal logic. Springer, Berlin, 1985.
* Robert M. Solovay, ``Provability Interpretations of Modal Logic``, Israel Journal of Mathematics
'' Israel Journal of Mathematics'' is a peer-reviewed mathematics journal published by the Hebrew University of Jerusalem ( Magnes Press).
History
Founded in 1963, as a continuation of the ''Bulletin of the Research Council of Israel'' (Section ...
, Vol. 25 (1976): 287–304.
* Rineke Verbrugge
Provability logic
from the Stanford Encyclopedia of Philosophy
The ''Stanford Encyclopedia of Philosophy'' (''SEP'') is a freely available online philosophy resource published and maintained by Stanford University, encompassing both an online encyclopedia of philosophy and peer-reviewed original publication ...
.
External links
*
Modal logic
Proof theory
{{logic-stub