Metavariable
In logic, a metavariable (also metalinguistic variable[1] or syntactical variable)[2] is a symbol or symbol string which belongs to a metalanguage and stands for elements of some object language. For instance, in the sentence
- Let A and B be two sentences of a language ℒ
the symbols A and B are part of the metalanguage in which the statement about the object language ℒ is formulated.
John Corcoran considers this terminology unfortunate because it obscures the use of schemata and because such "variables" do not actually range over a domain.[3]:220
The convention is that a metavariable is to be uniformly substituted with the same instance in all its appearances in a given schema. This is in contrast with nonterminal symbols in formal grammars where the nonterminals on the right of a production can be substituted by different instances.[4]
Attempts to formalize the notion of metavariable result in some kind of type theory.[5]
See also
Notes
- Hunter, p. 13.
- Shoenfield 2001, p. 7.
- Corcoran 2006, p. 220.
- Tennent 2002, pp. 36–37, 210.
- Masahiko Sato, Takafumi Sakurai, Yukiyoshi Kameyama, and Atsushi Igarashi. "Calculi of Meta-variables" in Computer Science Logic. 17th International Workshop CSL 2003. 12th Annual Conference of the EACSL. 8th Kurt Gödel Colloquium, KGC 2003, Vienna, Austria, August 25-30, 2003. Proceedings, Springer Lecture Notes in Computer Science 2803. ISBN 3-540-40801-0. pp. 484–497
References
- Corcoran, J. (2006). "Schemata: the Concept of Schema in the History of Logic" (PDF). Bulletin of Symbolic Logic. 12: 219–240.
- Hunter, Geoffrey. Metalogic: An Introduction to the Metatheory of Standard First-Order Logic.
- Shoenfield, Joseph R. (2001) [1967]. Mathematical Logic (2nd ed.). A K Peters. ISBN 978-1-56881-135-2.
- Tennent, R. D. (2002). Specifying Software: A Hands-On Introduction. Cambridge University Press. ISBN 978-0-521-00401-5.