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Please use this identifier to cite or link to this item: https://ah.lib.nccu.edu.tw/handle/140.119/56880
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dc.contributor.advisor余屹正zh_TW
dc.contributor.advisorYu, Yih Jengen_US
dc.contributor.author周惠雯zh_TW
dc.contributor.authorChou, Hui Wenen_US
dc.creator周惠雯zh_TW
dc.creatorChou, Hui Wenen_US
dc.date2012en_US
dc.date.accessioned2013-02-01T08:53:18Z-
dc.date.available2013-02-01T08:53:18Z-
dc.date.issued2013-02-01T08:53:18Z-
dc.identifierG0099751014en_US
dc.identifier.urihttp://nccur.lib.nccu.edu.tw/handle/140.119/56880-
dc.description碩士zh_TW
dc.description國立政治大學zh_TW
dc.description應用數學研究所zh_TW
dc.description99751014zh_TW
dc.description101zh_TW
dc.description.abstract在本碩士論文中, 我們闡述了投射有限群表現, 以及其形變理論。 我們亦特別研究這些表示在 GL_1 和 GL_2 之形變, 並且給了可表示化 的判定準則。 最後, 我們解釋相對應的泛形變環之扎里斯基切空間與 群餘調之關連, 並計算了 GL_1 的泛形變表現。zh_TW
dc.description.abstractIn this master thesis, we give an exposition of the deformation theory of representations for GL_1 and GL_2, respectively, of certain profinite groups. We give rigidity conditions of the fixed representation and verify several conditions for the representability. Finally, we interpret the Zariski tangent spaces of respective universal deformation rings as certain group cohomology and calculate the universal deformation for GL_1.en_US
dc.description.tableofcontents謝辭 v\nAbstract vi\n摘要 vii\nNotations viii\nContents xi\n1 Introduction 1\n2 Profinite Groups and their Representations 6\n2.1 Projective limits 6\n2.2 Profinite groups 7\n2.3 Representations of profinite groups 9\n2.4 The p-finiteness condition 12\n3 Deformation Theory 15\n3.1 The ring of Witt vectors 15\n3.2 The deformation functor 17\n3.3 Pro-representability 20\n3.4 Schlessinger’s criteria 23\n3.5 The Zariski tangent space and its cohomological interpretation 25\n4 The Existence of the Universal Deformation 31\n4.1 Verification of condition (H1) 31\n4.2 Verification of condition (H2) 33\n4.3 Verification of condition (H3) 33\n4.4 Verification of condition (H4) 34\n4.5 The main theorem 36\n4.6 Absolutely irreducible representations 36\n4.7 Example: the case GL_1 38\nA Categories and Functors 40\nA.1 Categories 40\nA.2 Functors 42\nA.3 Representability 43\nB Cohomology for profinite groups 45\nB.1 G-modules 45\nB.2 Cohomology for profinite groups 46\nBibliography 50\nIndex 53zh_TW
dc.language.isoen_US-
dc.source.urihttp://thesis.lib.nccu.edu.tw/record/#G0099751014en_US
dc.subject投射有限群zh_TW
dc.subject表現zh_TW
dc.subject形變zh_TW
dc.subject泛形變zh_TW
dc.subject泛形變環zh_TW
dc.subject扎里斯基切空間zh_TW
dc.subjectProfinite groupsen_US
dc.subjectRepresentationsen_US
dc.subjectDeformationsen_US
dc.subjectUniversal deformationsen_US
dc.subjectUniversal deformation ringsen_US
dc.subjectZariski tangent spaceen_US
dc.subjectGroup cohomologyen_US
dc.title投射有限群表現之形變理論zh_TW
dc.titleDeformation Theory of Representations of Profinite Groupsen_US
dc.typethesisen
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