MARC details
000 -LEADER |
fixed length control field |
02138 a2200241 4500 |
008 - FIXED-LENGTH DATA ELEMENTS--GENERAL INFORMATION |
fixed length control field |
210324b ||||| |||| 00| 0 eng d |
020 ## - INTERNATIONAL STANDARD BOOK NUMBER |
International Standard Book Number |
9780521109901 |
082 ## - DEWEY DECIMAL CLASSIFICATION NUMBER |
Classification number |
512.24 |
Item number |
LAU |
100 ## - MAIN ENTRY--PERSONAL NAME |
Personal name |
Laumon, GĂ©rard |
245 ## - TITLE STATEMENT |
Title |
Cohomology of drinfeld modular varieties. Part 2, Automorphic forms, trace formulas, and langlands correspondence |
260 ## - PUBLICATION, DISTRIBUTION, ETC. (IMPRINT) |
Name of publisher, distributor, etc |
Cambridge University Press, |
Date of publication, distribution, etc |
2009. |
Place of publication, distribution, etc |
Cambridge: |
300 ## - PHYSICAL DESCRIPTION |
Extent |
xi, 366p. : ill. ; |
Other physical details |
pb, |
Dimensions |
23 cm. |
365 ## - TRADE PRICE |
Price type code |
GBP |
Price amount |
53.99 |
440 ## - SERIES STATEMENT/ADDED ENTRY--TITLE |
Title |
Cambridge studies in advanced mathematics ; 56 |
504 ## - BIBLIOGRAPHY, ETC. NOTE |
Bibliography, etc |
Includes index and bibliographical references. |
520 ## - SUMMARY, ETC. |
Summary, etc |
Cohomology of Drinfeld Modular Varieties provides an introduction, in two volumes, both to this subject and to the Langlands correspondence for function fields. These varieties are the analogues for function fields of the Shimura varieties over number fields. The Langlands correspondence is a conjectured link between automorphic forms and Galois representations over a global field. By analogy with the number-theoretic case, one expects to establish the conjecture for function fields by studying the cohomology of Drinfeld modular varieties, which has been done by Drinfeld himself for the rank two case. This second volume is concerned with the Arthur-Selberg trace formula, and with the proof in some cases of the Rmamanujan-Petersson conjecture and the global Langlands conjecture for function fields. It is based on graduate courses taught by the author, who uses techniques which are extensions of those used to study Shimura varieties. Though the author considers only the simpler case of function rather than number fields, many important features of the number field case can be illustrated. Several appendices on background material keep the work reasonably self-contained. It is the first book on this subject and will be of much interest to all researchers in algebraic number theory and representation theory.<br/> |
650 ## - SUBJECT ADDED ENTRY--TOPICAL TERM |
Topical term or geographic name as entry element |
Drinfeld modular varieties |
650 ## - SUBJECT ADDED ENTRY--TOPICAL TERM |
Topical term or geographic name as entry element |
modular varieties |
650 ## - SUBJECT ADDED ENTRY--TOPICAL TERM |
Topical term or geographic name as entry element |
Homology theory |
650 ## - SUBJECT ADDED ENTRY--TOPICAL TERM |
Topical term or geographic name as entry element |
Trace formulas |
650 ## - SUBJECT ADDED ENTRY--TOPICAL TERM |
Topical term or geographic name as entry element |
Automorphic forms |
942 ## - ADDED ENTRY ELEMENTS (KOHA) |
Source of classification or shelving scheme |
Dewey Decimal Classification |
Item type |
Books |