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دانلود کتاب A local trace formula for the Gan-Gross-Prasad conjecture for unitary groups: the Archimedean case
دانلود کتاب فرمول ردیابی محلی برای حدس گان-گروس-پراساد برای گروه های واحد: مورد ارشمیدسی
مشخصات کتاب
A local trace formula for the Gan-Gross-Prasad conjecture for unitary groups: the Archimedean case
ویرایش:
نویسندگان: Raphaël Beuzart-Plessis
سری: Astérisque 418
ISBN (شابک) : 9782856299197
ناشر: Société Mathématique de France
سال نشر: 2020
تعداد صفحات: 320
زبان: English
فرمت فایل : PDF (درصورت درخواست کاربر به PDF، EPUB یا AZW3 تبدیل می شود)
حجم فایل: 2 مگابایت
قیمت کتاب (تومان) : 62,000
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توجه داشته باشید کتاب فرمول ردیابی محلی برای حدس گان-گروس-پراساد برای گروه های واحد: مورد ارشمیدسی نسخه زبان اصلی می باشد و کتاب ترجمه شده به فارسی نمی باشد. وبسایت اینترنشنال لایبرری ارائه دهنده کتاب های زبان اصلی می باشد و هیچ گونه کتاب ترجمه شده یا نوشته شده به فارسی را ارائه نمی دهد.
توضیحاتی درمورد کتاب به خارجی
فهرست مطالب
Introduction Chapter 1. Preliminaries 1.1. General notation and conventions 1.2. Reminder of norms on algebraic varieties 1.3. A useful lemma 1.4. Common spaces of functions 1.5. Harish-Chandra Schwartz space 1.6. Measures 1.7. Spaces of conjugacy classes and invariant topology 1.8. Orbital integrals and their Fourier transforms 1.9. (G,M)-families 1.10. Weighted orbital integrals Chapter 2. Representations 2.1. Smooth representations, elliptic regularity 2.2. Unitary and tempered representations 2.3. Parabolic induction 2.4. Normalized intertwining operators 2.5. Weighted characters 2.6. Matricial Paley-Wiener theorem and Plancherel-Harish-Chandra theorem 2.7. Elliptic representations and the space X(G) Chapter 3. Harish-Chandra descent 3.1. Invariant analysis 3.2. Semi-simple descent 3.3. Descent from the group to its Lie algebra 3.4. Parabolic induction of invariant distributions Chapter 4. Quasi-characters 4.1. Quasi-characters when F is p-adic 4.2. Quasi-characters on the Lie algebra for F=R 4.3. Local expansions of quasi-characters on the Lie algebra when F=R 4.4. Quasi-characters on the group when F=R 4.5. Functions c 4.6. Homogeneous distributions on spaces of quasi-characters 4.7. Quasi-characters and parabolic induction 4.8. Quasi-characters associated to tempered representations and Whittaker datas Chapter 5. Strongly cuspidal functions 5.1. Definition, first properties 5.2. Weighted orbital integrals of strongly cuspidal functions 5.3. Spectral characterization of strongly cuspidal functions 5.4. Weighted characters of strongly cuspidal functions 5.5. The local trace formulas for strongly cuspidal functions 5.6. Strongly cuspidal functions and quasi-characters 5.7. Lifts of strongly cuspidal functions Chapter 6. The Gan-Gross-Prasad triples 6.1. Hermitian spaces and unitary groups 6.2. Definition of GGP triples 6.3. The multiplicity m() 6.4. H\"026E30F G is a spherical variety, good parabolic subgroups 6.5. Some estimates 6.6. Relative weak Cartan decompositions 6.7. The function H\"026E30F G 6.8. Parabolic degenerations Chapter 7. Explicit tempered intertwinings 7.1. The -integral 7.2. Definition of L 7.3. Asymptotics of tempered intertwinings 7.4. Explicit intertwinings and parabolic induction 7.5. Proof of Theorem 7.2.1 7.6. A corollary Chapter 8. The distributions J and J`39`42`\"613A``45`47`\"603ALie 8.1. The distribution J 8.2. The distribution J`39`42`\"613A``45`47`\"603ALie Chapter 9. Spectral expansion 9.1. The theorem 9.2. Study of an auxiliary distribution 9.3. End of the proof of Theorem 9.1.1 Chapter 10. The spectral expansion of J`39`42`\"613A``45`47`\"603ALie 10.1. The affine subspace 10.2. Conjugation by N 10.3. Characteristic polynomial 10.4. Characterization of \' 10.5. Conjugacy classes in \' 10.6. Borel subalgebras and \' 10.7. The quotient \'(F)/H(F) 10.8. Statement of the spectral expansion of J`39`42`\"613A``45`47`\"603ALie 10.9. Introduction of a truncation 10.10. Change of truncation 10.11. End of the proof of Theorem 10.8.1 Chapter 11. Geometric expansions and a formula[2pt] for the multiplicity 11.1. Some spaces of conjugacy classes 11.2. The linear forms m`39`42`\"613A``45`47`\"603Ageom and m`39`42`\"613A``45`47`\"603Ageom`39`42`\"613A``45`47`\"603ALie 11.3. Geometric multiplicity and parabolic induction 11.4. Statement of three theorems 11.5. Equivalence of Theorem 11.4.1 and Theorem 11.4.2 11.6. Semi-simple descent and the support of J`39`42`\"613A``45`47`\"603Aqc-m`39`42`\"613A``45`47`\"603Ageom 11.7. Descent to the Lie algebra and equivalence of Theorem 11.4.1 and Theorem 11.4.3 11.8. A first approximation of J`39`42`\"613A``45`47`\"603Aqc`39`42`\"613A``45`47`\"603ALie-m`39`42`\"613A``45`47`\"603Ageom`39`42`\"613A``45`47`\"603ALie 11.9. End of the proof Chapter 12. An application to the[2pt] Gan-Gross-Prasad conjecture 12.1. Strongly stable conjugacy classes, transfer between pure inner forms and the Kottwitz sign 12.2. Pure inner forms of a GGP triple 12.3. The local Langlands correspondence 12.4. The theorem 12.5. Stable conjugacy classes inside (G,H) 12.6. Proof of Theorem 12.4.1 Appendix A. Topological vector spaces A.1. LF spaces A.2. Vector-valued integrals A.3. Smooth maps with values in topological vector spaces A.4. Holomorphic maps with values in topological vector spaces A.5. Completed projective tensor product, nuclear spaces Appendix B. Some estimates B.1. Three lemmas B.2. Asymptotics of tempered Whittaker functions for general linear groups B.3. Unipotent estimates Bibliography List of notations
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