04717nam 2200661 a 450 991045780480332120200520144314.01-283-35958-8978661335958290-272-8060-6(CKB)2550000000074306(EBL)805771(OCoLC)769342183(SSID)ssj0000633109(PQKBManifestationID)11389685(PQKBTitleCode)TC0000633109(PQKBWorkID)10620114(PQKB)10549469(MiAaPQ)EBC805771(Au-PeEL)EBL805771(CaPaEBR)ebr10517190(EXLCZ)99255000000007430619831206d1982 uy 0engur|n|---|||||txtccrCatastrophe theoretic semantics[electronic resource] an elaboration and application of René Thom's theory /by Wolfgang WildgenAmsterdam ;Philadelphia J. Benjamins19821 online resource (128 p.)Pragmatics & beyond,0166-6258 ;3:5Includes index.90-272-2525-7 Bibliography: p. [115]-122.CATASTROPHE THEORETIC SEMANTICS An Elaboration and Application of René Thorn's Theory; Editorial page; Title page; Dedication; Copyrigh page; Table of contents; INTRODUCTION; 1. APPLIED CATASTROPHE THEORY: A SHORT INTRODUCTION; 1.1. A sketch of the mathematical basis; 1.2. Catastrophe Conventions.; 1.3. The finite set of typical paths in the elementary unfoldings; 1.4. An example: the standard cusp; 2. SEMANTICS FROM A DYNAMIC PERSPECTIVE; 2.1. Aspects of dynamic semiotics; 2.2. The type o f semantics aimed at by our model construction2.3. Formal semantics on the basis of catastrophe theory: a comparison with logical semantics2.4. Principles of interpretation; 2.5. Rene Thorn's list of semantic archetypes; 3. THE HEART OF CATASTROPHE THEORETIC SEMANTICS: THE SET OF SEMANTIC ARCHETYPES; 3.1. The semantic archetypes derivable from the zero-unfolding; 3.2. The semantic archetypes derivable from the fold; 3.3. The semantic archetypes derivable from the cusp; 3.3.1 The standard cusp (A+3); 3.3.2. The dual cusp (A-3); 3.3.3. Versal unfoldings of the standard cusp3.3.4. Introducing higher archetypes: The archetype of bipolar differentiation3.4 The semantic archetypes derivable from the swallowtail; 3.5 The semantic archetypes derivable from the butterfly; 3.5.1 Sketching the geometry of the standard butterfly (A+5); 3.5.2 Derivations on the basis of the perfect delay convention; 3.5.3. Derivations on the basis of the Maxwell convention; 3.5.4. Some semi-elementary archetypes derivable from the dual butterfly(A-5); 3.5.5. Summary of the archetypes derived from the butterfly; (1) Elementary archetypes.; (2) Semi-elementary archetypes(3) Higher archetypes3.6 Archetypes derivable from unfoldings with codimension > 4 and corank 1; 3.7 Semantic archetypes derivable from the compactified umbilics (D+4 D-4,D5); 4. APPLICATION OF CATASTROPHE THEORETIC SEMANTICS; 4.1. Dynamic inferences; 4.2 Word semantics; 4.3 Linguistic vagueness; 4.4. Compositional processes; 4.5. Application in neurolinguistics; 5. BEYOND CATASTROPHE THEORETIC SEMANTICS; 5.1. Beyond semantics: towards a dynamic theory of language; 5.2. Beyond Catastrophe Theory; FOOTNOTES; REFERENCES; INDEXRené Thom, the famous French mathematician and founder of catastrophe theory, considered linguistics an exemplary field for the application of his general morphology. It is surprising that physicists, chemists, biologists, psychologists and sociologists are all engaged in the field of catastrophe theory, but that there has been almost no echo from linguistics. Meanwhile linguistics has evolved in the direction of René Thom's intuitions about an integrated science of language and it has become a necessary task to review, update and elaborate the proposals made by Thom and to embed them in the fPragmatics & beyond ;3:5.SemanticsMathematical modelsLanguage and languagesVariationCatastrophes (Mathematics)Electronic books.SemanticsMathematical models.Language and languagesVariation.Catastrophes (Mathematics)401.43401/.43Wildgen Wolfgang214518MiAaPQMiAaPQMiAaPQBOOK9910457804803321Catastrophe theoretic semantics606565UNINA