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Period Domains over Finite and p-adic Fields Jean-Francois Dat (Universite de Paris VI (Pierre et Marie Curie))

Period Domains over Finite and p-adic Fields By Jean-Francois Dat (Universite de Paris VI (Pierre et Marie Curie))

Period Domains over Finite and p-adic Fields by Jean-Francois Dat (Universite de Paris VI (Pierre et Marie Curie))


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Summary

This systematic exposition of the basics of period domains is a pedagogical introduction accessible to any graduate student with a basic knowledge in algebraic geometry and algebraic groups. The authors provide numerous worked examples, remarks on open questions, historical context and references to the literature.

Period Domains over Finite and p-adic Fields Summary

Period Domains over Finite and p-adic Fields by Jean-Francois Dat (Universite de Paris VI (Pierre et Marie Curie))

This book is, on the one hand, a pedagogical introduction to the formalism of slopes, of semi-stability and of related concepts in the simplest possible context. It is therefore accessible to any graduate student with a basic knowledge in algebraic geometry and algebraic groups. On the other hand, the book also provides a thorough introduction to the basics of period domains, as they appear in the geometric approach to local Langlands correspondences and in the recent conjectural p-adic local Langlands program. The authors provide numerous worked examples and establish many connections to topics in the general area of algebraic groups over finite and local fields. In addition, the end of each section includes remarks on open questions, historical context and references to the literature.

Period Domains over Finite and p-adic Fields Reviews

'This monograph is a systematic treatise on period domains over finite and over p-adic fields. It presents the theory as it has developed over the past fifteen years ... The book should serve as the basis of future research in this area.' Zentralblatt MATH

About Jean-Francois Dat (Universite de Paris VI (Pierre et Marie Curie))

Jean-Francois Dat is a Professor at the Universite de Paris VII. Sascha Orlik is a Professor at the Universitat Paderborn. Michael Rapoport is a Professor at the Universitat Bonn.

Table of Contents

Preface; Introduction; Part I. Period Domains for GLn Over a Finite Field: 1. Filtered vector spaces; 2. Period domains for GLn; 3. Cohomology of period domains for GLn; Part II. Period Domains for Reductive Groups over Finite Fields: 4. Interlude on the Tannakian formalism; 5. Filtrations on repk(G); 6. Period domains for reductive groups; 7. Cohomology of period domains for reductive groups; Part III. Period Domains over p-adic Fields: 8. Period domains over p-adic fields; 9. Period domains for p-adic reductive groups; 10. Cohomology of period domains over p-adic fields; Part IV. Complements: 11. Further aspects of period domains; References; Index.

Additional information

NPB9780521197694
9780521197694
0521197694
Period Domains over Finite and p-adic Fields by Jean-Francois Dat (Universite de Paris VI (Pierre et Marie Curie))
New
Hardback
Cambridge University Press
2010-07-08
396
N/A
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