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200 00$aModifying adjuncts /$fedited by Ewald Lang, Claudia Maienborn, Cathrine Fabricius-Hansen
205   $aReprint 2013
210  1$aBerlin :$cMouton de Gruyter,$d[2003]
210  4$d©2003
215   $a1 online resource (663 pages) $cillustrations
225 0 $aInterface Explorations [IE] ;$v4
300   $aBibliographic Level Mode of Issuance: Monograph
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320   $aIncludes bibliographical references and index.
327   $tFront matter --$tContents --$tModifying (the grammar of) adjuncts: an introduction /$rLang, Ewald / Maienborn, Claudia / Fabricius-Hansen, Cathrine --$tPart A: The argument-adjunct distinction --$tThe dual analysis of adjuncts/complements in Categorial Grammar /$rDowty, David --$tGenitives, relational nouns, and argument-modifier ambiguity /$rPartee, Barbara H. / Borschev, Vladimir --$tHeads, complements, adjuncts: Projection and saturation /$rBierwisch, Manfred --$tPart ?: Adjunct placement --$tSyntactic conditions on adjunct classes /$rFrey, Werner --$t"Manner" adverbs and the association theory: Some problems and solutions /$rShaer, Benjamin --$tManner adverbs and information structure: Evidence from the adverbial modification of verbs of creation /$rEckardt, Regine --$tSemantic features and the distribution of adverbs /$rErnst, Thomas --$tClause-final left-adjunction /$rRosengren, Inger --$tPart C: Case studies on wieder/again --$tProcess, eventuality, and wieder,/again /$rPittner, Karin --$tCompetition and interpretation: The German adverb wieder ('again') /$rJäger, Gerhard / Blutner, Reinhard --$tHow are results represented and modified? Remarks on Jäger & Blutner's anti-decomposition /$rStechow, Arnim Von --$tPart D: Flexibility of eventuality-related modification --$tEvent arguments, adverb selection, and the Stative Adverb Gap /$rKatz, Graham --$tEvent-internal modifiers: Semantic underspecification and conceptual interpretation /$rMaienborn, Claudia --$tFlexibility in adverbal modification: Reinterpretation as contextual enrichment /$rDölling, Johannes --$tSecondary predication and aspectual structure /$rRothstein, Susan --$tReal adjuncts in the Instrumental in Russian /$rDemjjanow, Assinja / Strigin, Anatoli --$tGerman participle II constructions as adjuncts /$rZimmermann, Ilse --$tSubject index
330   $aUnlike the notion of "argument" that is central to modern linguistic theorizing, the phenomena that are commonly subsumed under the complementary notion "adjunct" so far have not attracted the attention they deserve. In this volume, leading experts in the field present current approaches to the grammar and pragmatics of adjuncts. The contributions scrutinize i.a. the argument-adjunct distinction, specify conditions of adjunct placement, discuss compositionality issues, and propose new analyses of event-related modification. They are meant to shed new light on an area of linguistic structure that is deemed to be notoriously overlooked.
606   $aGrammar, Comparative and general$xAdjuncts
606   $aGrammar, Comparative and general$xSyntax
615  0$aGrammar, Comparative and general$xAdjuncts.
615  0$aGrammar, Comparative and general$xSyntax.
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200 10$aBasic global relative invariants for homogeneous linear differential equations /$fRoger Chalkley
210  1$aProvidence, Rhode Island :$cAmerican Mathematical Society,$d[2002]
210  4$d©2002
215   $a1 online resource (223 p.)
225 1 $aMemoirs of the American Mathematical Society,$x0065-9266 ;$vnumber 744
300   $a"Volume 156, number 744 (end of volume)."
311   $a0-8218-2781-2 
320   $aIncludes bibliographical references (pages 197-199) and index.
327   $a""Chapter 4. L[sub(n)] and I[sub(n,i)] as Semi-Invariants of the First Kind""""Chapter 5. V[sub(n)] and J[sub(n,i)] as Semi-Invariants of the Second Kind""; ""Chapter 6. The Coefficients of Transformed Equations""; ""6.1. Alternative formulas for c**[sub(i)](I??) in (1.5)""; ""6.2. The coefficients of a composite transformation""; ""6.3. Several examples""; ""6.4. Proof of an old observation""; ""6.5. Conditions for transformed equations""; ""6.6. Formulas for later reference""; ""Chapter 7. Formulas That Involve L[sub(n)](z) or I[sub(n,n)](z)""
327   $a""7.1. The coefficients of (6.8) when d[sub(1)](I??) a??¡ d[sub(2)]((I??) a??¡ 0""""7.2. Derivatives for the coefficients of (6.8) when d[sub(1)](I??) a??¡ d[sub(2)]((I??) a??¡ 0""; ""7.3. Identities for the coefficients of (6.8) when d[sub(1)](I??) a??¡ d[sub(2)]((I??) a??¡ 0""; ""Chapter 8. Formulas That Involve V[sub(n)](z) or J[sub(n,n)](z)""; ""8.1. The coefficients of (6.8) when d[sub(1)](I??) a??¡ d[sub(2)]((I??) a??¡ 0""; ""8.2. Derivatives for the coefficients of (6.8) when d[sub(1)](I??) a??¡ d[sub(2)]((I??) a??¡ 0""
327   $a""8.3. Identities for the coefficients of (6.8) when d[sub(1)](I??) a??¡ d[sub(2)]((I??) a??¡ 0""""Chapter 9. Verification of I[sub(n,n)] a??¡ J[sub(n,n)]and Various Observations""; ""9.1. Proof for the first part of the Main Theorem in Chapter 1""; ""9.2. Global sets""; ""9.3. A fourth type of invariant: an absolute invariant""; ""9.4. Laguerre-Forsyth canonical forms""; ""Chapter 10. The Local Constructions of Earlier Research""; ""10.1. Standard techniques""; ""10.2. An improved computational procedure""; ""10.3. Hindrances to earlier research""
327   $a""Chapter 11. Relations for G[sub(i)], H[sub(i)], and L[sub(i)] That Yield Equivalent Formulas for Basic Relative Invariants""
410  0$aMemoirs of the American Mathematical Society ;$vno. 744.
606   $aDifferential equations, Linear
606   $aInvariants
615  0$aDifferential equations, Linear.
615  0$aInvariants.
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