formal linguistics Formal linguistics is the branch of linguistics which uses applied mathematical methods for the analysis of natural languages. Such methods include formal languages, formal grammars and first-order logical expressions. Formal linguistics also forms ...

, discourse representation theory (DRT) is a framework for exploring meaning under a formal semantics approach. One of the main differences between DRT-style approaches and traditional Montagovian approaches is that DRT includes a level of abstract

mental representation A mental representation (or cognitive representation), in philosophy of mind, cognitive psychology, neuroscience, and cognitive science, is a hypothetical internal cognitive symbol that represents external reality, or else a mental process that ...

s (discourse representation structures, DRS) within its formalism, which gives it an intrinsic ability to handle meaning across sentence boundaries. DRT was created by Hans Kamp in 1981. A very similar theory was developed independently by Irene Heim in 1982, under the name of ''File Change Semantics'' (FCS). Discourse representation theories have been used to implement semantic parsers and

natural language understanding Natural-language understanding (NLU) or natural-language interpretation (NLI) is a subtopic of natural-language processing in artificial intelligence that deals with machine reading comprehension. Natural-language understanding is considered an A ...

systems.Rapaport, William J.
Syntactic semantics: Foundations of computational natural-language understanding
" Thinking Computers and Virtual Persons. 1994. 225-273.

Discourse representation structures

DRT uses ''discourse representation structure''s (DRS) to represent a hearer's mental representation of a discourse as it unfolds over time. There are two critical components to a DRS: * A set of ''discourse referents'' representing entities that are under discussion. * A set of ''DRS conditions'' representing information that has been given about discourse referents. Consider Sentence (1) below: :(1) A farmer owns a donkey. The DRS of (1) can be notated as (2) below: :(2) ,y: farmer(x), donkey(y), owns(x,y) What (2) says is that there are two discourse referents, x and y, and three discourse conditions ''farmer'', ''donkey'', and ''owns'', such that the condition ''farmer'' holds of x, ''donkey'' holds of y, and ''owns'' holds of the pair x and y. Informally, the DRS in (2) is true in a given model of evaluation if and only if there are entities in that model that satisfy the conditions. So, if a model contains two individuals, and one is a farmer, the other is a donkey, and the first owns the second, the DRS in (2) is true in that model. Uttering subsequent sentences results in the existing DRS being updated. :(3) He beats it. Uttering (3) after (1) results in the DRS in (2) being updated as follows, in (4) (assuming a way to disambiguate which pronoun refers to which individual). :(4) ,y: farmer(x), donkey(y), own(x,y), beat(x,y) Successive utterances of sentences work in a similar way, although the process is somewhat more complicated for more complex sentences such as sentences containing

negation In logic, negation, also called the logical complement, is an operation that takes a proposition P to another proposition "not P", written \neg P, \mathord P or \overline. It is interpreted intuitively as being true when P is false, and false ...

, and

conditionals Conditional (if then) may refer to: *Causal conditional, if X then Y, where X is a cause of Y *Conditional probability, the probability of an event A given that another event B has occurred *Conditional proof, in logic: a proof that asserts a co ...

''Donkey'' anaphora

In one sense, DRT offers a variation of first-order predicate calculus—its forms are pairs of first-order formulae and the

free variable In mathematics, and in other disciplines involving formal languages, including mathematical logic and computer science, a free variable is a notation (symbol) that specifies places in an expression where substitution may take place and is not ...

s that occur in them. In traditional natural language

semantics Semantics (from grc, σημαντικός ''sēmantikós'', "significant") is the study of reference, meaning, or truth. The term can be used to refer to subfields of several distinct disciplines, including philosophy, linguistics and comput ...

, only individual sentences are examined, but the context of a dialogue plays a role in meaning as well. For example, anaphoric pronouns such as ''he'' and ''she'' rely upon previously introduced individual constants in order to have meaning. DRT uses variables for every individual constant in order to account for this problem. A discourse is represented in a ''discourse representation structure'' (DRS), a box with variables at the top and the sentences in the

formal language In logic, mathematics, computer science, and linguistics, a formal language consists of words whose letters are taken from an alphabet and are well-formed according to a specific set of rules. The alphabet of a formal language consists of sym ...

below in the order of the original discourse. Sub-DRS can be used for different types of sentences. One of the major advantages of DRT is its ability to account for

donkey sentence Donkey sentences are sentences that contain a pronoun with clear meaning (it is bound semantically) but whose syntactical role in the sentence poses challenges to grammarians. Such sentences defy straightforward attempts to generate their formal ...

s (

Geach Geach is a surname. Notable people with the surname include: * Carveth Geach (1928–2005), Chief Scout of the Boy Scouts of South Africa * Peter Geach (1916–2013), British philosopher and professor * Portia Geach (1973–1959), Australian artist ...

1962) in a principled fashion: :(5) Every farmer who owns a donkey beats ''it''. Sentence (5) can be paraphrased as follows: Every farmer who owns a donkey beats the donkey that he/she owns. Under a Montagovian approach, the indefinite ''a donkey'', which is assumed to be inherently an

existential quantifier In predicate logic, an existential quantification is a type of quantifier, a logical constant which is interpreted as "there exists", "there is at least one", or "for some". It is usually denoted by the logical operator symbol ∃, which, w ...

, ends up becoming a

universal quantifier In mathematical logic, a universal quantification is a type of quantifier, a logical constant which is interpreted as "given any" or "for all". It expresses that a predicate can be satisfied by every member of a domain of discourse. In other ...

, an unwelcome result because the change in quantificational force cannot be accounted for in any principled way. DRT avoids this problem by assuming that indefinites introduce discourse referents (DRs), which are stored in the mental representation and are accessible (or not, depending on the conditions) to expressions like pronouns and other anaphoric elements. Furthermore, they are inherently non-quantificational, and pick up quantificational force depending upon the context. On the other hand, genuine quantifiers (e.g., 'every professor') bear scope. An 'every- NP' triggers the introduction of a complex condition of the form K1 → K2, where K1 and K2 are sub-DRSs representing the restriction and the scope of the quantification respectively. Unlike true quantifiers, indefinite noun phrases just contribute a new DR (together with some descriptive material in terms of conditions on the DR), which is placed in a larger structure. This larger structure can be the top-level DRS or some sub-DRS according to the sentence-internal environment of the analyzed noun phrase—in other words, a level that is accessible to an anaphor that comes later.

References

* Kadmon, N. 2001. Formal Pragmatics: Semantics, Pragmatics, Presupposition, and Focus. Oxford: Blackwell Publishers. * Lewis, David
'Adverbs of Quantification'.
In ''Formal Semantics of Natural Language''. Edited by Edward L Keenan. Cambridge:

Cambridge University Press Cambridge University Press is the university press of the University of Cambridge. Granted letters patent by King Henry VIII in 1534, it is the oldest university press in the world. It is also the King's Printer. Cambridge University Pr ...

, 1975. Pages 3–15. * Moltmann, Friederike. 1997. Unbound Anaphoric Pronouns: E-Type, Dynamic and Structured Propositions Approaches'. Synthese 153, 2006. Pages 199-260. https://doi.org/10.1007/s11229-005-5469-x

External links

Boxer, a broad-coverage implementation of DRT

The Handbook of Philosophical Logic

Discourse Representation Theory

SEP Entry
{{Formal semantics Semantics Logic Systems_of_formal_logic

Discourse representation structures

''Donkey'' anaphora

See also

References

External links