The Oxford Handbook of Derivational Morphology
Author | : Rochelle Lieber |
Publisher | : Oxford Handbooks |
Total Pages | : 961 |
Release | : 2014 |
ISBN-10 | : 9780199641642 |
ISBN-13 | : 0199641641 |
Rating | : 4/5 (641 Downloads) |
Download or read book The Oxford Handbook of Derivational Morphology written by Rochelle Lieber and published by Oxford Handbooks. This book was released on 2014 with total page 961 pages. Available in PDF, EPUB and Kindle. Book excerpt: The Oxford Handbook of Derivational Morphology is intended as a companion volume to the Oxford Handbook of Compounding (OUP 2009), aiming to provide a comprehensive and thorough overview of the study of derivational morphology. Written by distinguished scholars, its 41 chapters are devoted to theoretical and definitional matters, formal and semantic issues, interdisciplinary connections, and detailed descriptions of derivational processes in a wide range of language families. It presents the reader with the current state of the art in the study of derivational morphology. The handbook begins with an overview and a consideration of definitional matters, distinguishing derivation from inflection on the one hand and compounding on the other. From a formal perspective, the handbook treats affixation (prefixation, suffixation, infixation, circumfixation, etc.), conversion, reduplication, root and pattern and other templatic processes, as well as prosodic and subtractive means of forming new words. From a semantic perspective, it looks at the processes that form various types of adjectives, adverbs, nouns, and verbs, as well as evaluatives and the rarer processes that form function words. Chapters are devoted to issues of theory, methodology, the historical development of derivation, and to child language acquisition, sociolinguistic, experimental, and psycholinguistic approaches. The second half of the book surveys derivation in fifteen language families that are widely dispersed in terms of both geographical location and typological characteristics. It ends with a consideration of both areal tendencies in derivation and the issue of universals.