Mathematical Structures of Language

E116652

Mathematical Structures of Language is a foundational work in mathematical linguistics that applies formal and algebraic methods to analyze the structure of natural languages.

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Mathematical Structures of Language canonical 1

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Statements (45)

Predicate Object
instanceOf book
work in mathematical linguistics
aimsTo analyze the structure of natural languages
provide rigorous mathematical treatment of language
appliesTo natural languages
contributesTo formal language theory in linguistics
foundations of mathematical linguistics
theoretical models of natural language
focusesOn algebraic description of language
formal representation of linguistic structure
mathematical models of grammar
hasApproach algebraic
axiomatic
formal
hasDiscipline formal linguistics
mathematical linguistics
theoretical linguistics
hasGoal bridge mathematics and linguistics
establish rigorous foundations for language theory
hasKeyConcept algebraic structure of grammar
formal models of natural language
formalization of linguistic rules
mathematical description of syntax
influences formal approaches to natural language
subsequent work in mathematical linguistics
intendedFor linguists
mathematicians
researchers in formal language theory
language English
mainSubject semantics
structure of natural language
syntax
relatedTo algebraic linguistics
automata theory
formal language theory
mathematical logic
theory of grammar
studies formal properties of linguistic systems
mathematical characterization of grammar
structural aspects of natural language
typeOfWork foundational study
research monograph
usesMethod algebraic methods
formal methods
mathematical logic

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Full triples — surface form annotated when it differs from this entity's canonical label.

Zellig Harris notableWork Mathematical Structures of Language