In mathematical logic and computer science the symbol 
has taken the name turnstile because of its resemblance to a typical turnstile if viewed from above. It is also referred to as tee and is often read as "yields" or "proves". The symbol was first used by Gottlob Frege in his 1879 book on logic, Begriffsschrift[1].
In TeX, the turnstile symbol is obtained from the command \vdash. In Unicode, the turnstile symbol ⊢ is called right tack and is at code point U+22A2[2]. On a typewriter, a turnstile can be composed from a vertical bar (|) and a dash (-). In LaTeX there is the turnstile package, which issues this sign in many ways, and is capable of putting labels below or above it, in the correct places. The article A Tool for Logicians is a tutorial on using this package.
Meaning
The turnstile is a binary relation. It has several different meanings in different contexts:
- In proof theory, the turnstile is used to denote provability. For example, if T is a formal theory and S is a particular sentence in the language of the theory then
means that S is provable from T[3]. This usage is demonstrated in the article on propositional calculus. - In the typed lambda calculus, the turnstile is used to separate typing assumptions from the typing judgement.[4][5]
- In the study of formal languages, the turnstile represents syntactic consequence. This is to say that it shows that one string can be derived from another in a single step, according to the rules for the formal language.[6]
- In category theory, a reversed turnstile, as in
, is used to indicate that the functor F is left adjoint to the functor G.
See also
Notes
- ^ Gottlob Frege, Begriffsschrift: Eine der arithmetischen nachgebildete Formelsprache des reinen Denkens. Halle, 1879.
- ^ Unicode standard
- ^ A. S. Troelstra and H. Schwichtenberg, Basic Proof Theory, second edition, Cambridge University Press, 2000, ISBN 978-0-521-77911-1.
- ^ http://www.mscs.dal.ca/~selinger/papers/lambdanotes.pdf
- ^ David A. Schmidt, The Structure of Typed Programming Languages, MIT Press, 1994, ISBN 0-262-19349-3
- ^ http://dingo.sbs.arizona.edu/~hammond/ling178-sp06/mathCh6.pdf
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