Erscheinungsdatum: 01/2010, Medium: Buch, Einband: Gebunden, Titel: Locality Domains in the Spanish Determiner Phrase, Autor: Ticio, M. Emma, Verlag: Springer-Verlag GmbH // Springer Netherland, Sprache: Englisch, Schlagworte: Romanistik // Spanisch // Literaturwissenschaft // Sprachgeschichte // Sprachwissenschaft // Grammatik // Syntax und Morphologie // Sprache: Geschichte und Allgemeines, Rubrik: Sprachwissenschaft // Romanische, Seiten: 219, Herkunft: GROSSBRITANNIEN (GB), Reihe: Studies in Natural Language and Linguistic Theory (Nr. 79), Gewicht: 487 gr, Verkäufer: averdo
This book proposes a new spell-out-based approach coached within the framework of Chomsky (2000, 2001). It defines a new spell-out mechanism that can handle existing cross-linguistic variations in what is spelled-out (and defined as a p-phrase) within a more integrated approach. Based on this spell-out-based approach, a new constraint-based system is developed translating (many of) the ways syntactic structures can be defined (mapped) onto phonological form into new OT constraints. The main assumption in this book is that phase heads belong to their spell-out domains (contra Chomsky, 2001 and subsequent work) and can regulate the spell-out process by deciding both the kind of spell-out applying and the timing of spell-out relevant. Moreover, this book introduces two new assumptions. The first assumption is that some kinds of phase heads can, in the case PIC2 is in effect, result in hindering, rather than initiating, spell-out on a previous phase, and the second is that some forms of XP movement are not motivated by an EPP feature of a strong phase head mainly v but they are rather motivated by a last resort strategy to accomplish a spell-out instruction of this strong phase head.
In mathematics, a multiplicative inverse or reciprocal for a number x, denoted by 1 x or x 1, is a number which when multiplied by x yields the multiplicative identity, 1. The multiplicative inverse of a fraction a b is b a. For the multiplicative inverse of a real number, divide 1 by the number. For example, the reciprocal of 5 is one fifth (1 5 or 0.2), and the reciprocal of 0.25 is 1 divided by 0.25, or 4. The reciprocal function, the function (x) that maps x to 1 x, is one of the simplest examples of a function which is self-inverse. The term reciprocal was in common use at least as far back as the third edition of Encyclopaedia Britannica (1797) to describe two numbers whose product is 1, geometrical quantities in inverse proportion are described as reciprocall in a 1570 translation of Euclid's Elements. In the phrase multiplicative inverse, the qualifier multiplicative is often omitted and then tacitly understood (in contrast to the additive inverse). Multiplicative inverses can be defined over many mathematical domains as well as numbers. In these cases it can happen that ab ba, then "inverse" typically implies that an element is both a left and right inverse.