Type–token distinction

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In disciplines such as logic, linguistics, metalogic, typography, and computer programming, the type–token distinction is a distinction that separates a descriptive concept from objects that instantiate the concept, seen as particular instances of it. For example, the sentence "the bicycle is in the garage" refers to a token of the type named "bicycle", while the sentence "the bicycle is becoming more popular" refers to the type.

This distinction in computer programming between classes and objects is similar, though in this context, "class" may refer to a set of objects (with class-level attribute or operations) rather than a description of an object in the set.

The words type, concept, property, quality, feature and attribute are all used in describing things. One might say a rose bush is a plant that instantiates the type, or embodies the concept, or exhibits the properties, or possesses the qualities, features or attributes “thorny”, “flowering” and “bushy”. The term "property" is used ambiguously to mean property type (height in feet) or property instance (1.74). The term "concept" is probably used more often for the property type (height in feet) than the property instance.

Types like "thorny" are often understood ontologically as concepts. Types exist in descriptions of objects, but not as tangible physical objects. A type may have many tokens. However, types are not directly producible as tokens may be. One can show someone a particular bicycle, but cannot show someone the type "bicycle", as in "the bicycle is popular."

One can distinguish between abstract "types" and the "tokens" or things that embody or exemplify types. If one hears that two people "have the same car", one can conclude that they have the same type of car (e.g. the same make and model), or the same particular token of the car (e.g. they share a single vehicle). The distinction is useful in other ways, during discussion of language.

Occurrences

There is a related distinction closely connected with the type-token distinction. This distinction is the distinction between an object, or type of object, and an occurrence of it. In this sense, an occurrence is not necessarily a token. Considering the sentence: "A rose is a rose is a rose". It is equally correct to state that there are eight or three words in the sentence. There are, in fact, three word types in the sentence: "rose", "is" and "a". There are eight word tokens in a token copy of the line. The line itself is a type. There are not eight word types in the line. It contains only the three word types, 'a,' 'is' and 'rose,' each of which is unique, but contains eight occurrences of words. There are three occurrences of the word type 'a,' two of 'is' and three of 'rose'.

The need to distinguish tokens of types from occurrences of types arises, not just in linguistics, but whenever types of things have other types of things occurring in them.^[1]

Typography

In typography, the type–token distinction is used to determine the presence of a text printed by movable type:^[2]

The defining criteria which a typographic print has to fulfil is that of the type identity of the various letter forms which make up the printed text. In other words: each letter form which appears in the text has to be shown as a particular instance ("token") of one and the same type which contains a reverse image of the printed letter.

Charles Sanders Peirce's type–token distinction

There are only 26 letters in the English alphabet and yet there are more than 26 letters in this sentence. Moreover, every time a child writes the alphabet 26 new letters have been created.

The word 'letters' was used three times in the above paragraph, each time in a different meaning. The word 'letters' is one of many words having "type–token ambiguity". The distinctions between types, tokens and occurrences were first made by the American logician-philosopher Charles Sanders Peirce in 1906 using terminology that he established.^[3]

The letters that are created by writing are physical objects that can be destroyed by various means: these are letter tokens or letter inscriptions. The 26 letters of the alphabet are letter types or letter forms.

Peirce's type–token distinction also applies to words, sentences, paragraphs, and so on: to anything in a universe of discourse of character-string theory, or concatenation theory. There is only one word type spelled L-E-T-T-E-R,^[4] namely, 'letter'; but every time that word type is written, a new word token has been created.

Some logicians consider a word type to be the class of its tokens. Other logicians counter that the word type has a permanence and constancy not found in the class of its tokens. The type remains the same while the class of its tokens is continually gaining new members and losing old members.

The word type 'letter' uses only four letter types: L, E, T and R. Nevertheless, it uses E twice and T twice. In standard terminology, the word type 'letter' has six letter occurrences and the letter type E occurs twice in the word type 'letter'. Whenever a word type is inscribed, the number of letter tokens created equals the number of letter occurrences in the word type.

See also

• Metalogic
• Formalism (philosophy)
• Is-a
• Class (philosophy)
• Type theory
• Type physicalism
• Mental model
• Map–territory relation
• Problem of universals #Peirce

Notes

References

• Baggin J., and Fosl, P. (2003) The Philosopher's Toolkit. Blackwell: 171-73. ISBN 978-0-631-22874-5.
• Peper F., Lee J., Adachi S.,Isokawa T. (2004) Token-Based Computing on Nanometer Scales, Proceeding of the ToBaCo 2004 Workshop on Token Based Computing, Vol.1 pp. 1–18.

External links

• The Stanford Encyclopedia of Philosophy: "Types and Tokens" by Linda Wetzel.