# eBook Base Change for GL(2). (AM-96), Volume 96 (Annals of Mathematics Studies) download

## by Robert P. Langlands

**ISBN:**0691082634

**Author:**Robert P. Langlands

**Publisher:**Princeton University Press; First Edition edition (August 21, 1980)

**Language:**English

**Pages:**236

**ePub:**1692 kb

**Fb2:**1659 kb

**Rating:**4.7

**Other formats:**mobi mbr lit docx

**Category:**Math Sciences

**Subcategory:**Mathematics

Start by marking Base Change for Gl(2)

Start by marking Base Change for Gl(2). Am-96), Volume 96 as Want to Read: Want to Read savin. ant to Read. R. Langlands shows, in analogy with Artin's original treatment of one-dimensional p, that at least for tetrahedral p, L(s, p) is equal to the L-function L(s, π) attached to a cuspdidal automorphic representation of the group GL(2, /A), /A being the adle ring of the field, and L(s, π), whose definition is.

com: Base Change for GL(2). Langlands shows, in analogy with Artin's original treatment of one-dimensional p, that at least for tetrahedral p, L(s, p) is equal to the L-function L(s, π) attached to a cuspdidal automorphic representation of the group GL(2, /A), /A being the adéle ring of the field, and L(s, π), whose definition is. ultimately due to Hecke, is known to be entire.

Langlands, Robert P. (1966), "The volume of the fundamental domain . Langlands, Robert P, Base change for GL(2). Robert Langlands at the Mathematics Genealogy Project. The work of Robert Langlands (a nearly complete archive). (1966), "The volume of the fundamental domain for some arithmetical subgroups of Chevalley groups", Algebraic Groups and Discontinuous Subgroups, Proc. Annals of Mathematics Studies, 96. Princeton University Press, Princeton, . ISBN 0-691-08263-4; MR 574808. Faculty page at IAS. Contenta, Sandro.

Annals of Mathematics Studies (Paperback). Princeton University Press. Assembled Product Dimensions (L x W x H). 3 x . 1 x . 8 Inches.

Find nearly any book by Robert P Langlands. Get the best deal by comparing prices from over 100,000 booksellers. AM-96), Volume 96 (Annals of Mathematics Studies)

Find nearly any book by Robert P Langlands. AM-96), Volume 96 (Annals of Mathematics Studies): Base Change for GL(2). AM-96), Volume 96 (Annals of Mathematics Studies): ISBN 9780691082639 (978-0-691-08263-9) Hardcover, Princeton University Press, 1980. Base Change for GL(2). AM-96), Volume 96 (Annals of Mathematics Studies): ISBN 9780691082721 (978-0-691-08272-1) Softcover, Princeton University Press, 1980. On the Functional Equations Satisfied by Eisenstein Series (Lecture Notes in Mathematics).

L, MRKEY {0574808}, AUTHOR {Langlands, Robert ., TITLE {Base Change for {${rm GL}(2)$}}, SERIES {Ann.

J. Arthur and L. Clozel, Simple Algebras, Base Change, and the Advanced Theory of the Trace Formula, Princeton, NJ: Princeton Univ. L, MRKEY {0574808}, AUTHOR {Langlands, Robert . VOLUME {96}, PUBLISHER {Princeton Univ.

Base Change for GL(2). AM-96), Volume 96 (Annals of Mathematics Studies). Lectures on Modules and Rings (Graduate Texts in Mathematics).

R The tools he employs here are the trace formula and harmonic analysis on the group GL(2) over a local field.

Langlands shows, in analogy with Artin's original treatment of one-dimensional p, that at least for tetrahedral p, L(s, p) is equal to the L-function L(s, ?) attached to a cuspdidal automorphic representation of the group GL(2, /A), /A being the adéle ring of the field, and L(s, ?), whose definition is ultimately due. to Hecke, is known to be entire. The main result, from which the existence of ? follows, is that it is always possible to transfer automorphic representations of GL(2) over one number field to representations over a cyclic extension of the field.

Langlands, Base change for GL(2). Annals of Mathematics Studies 96. Princeton University Press, Princeton, 1980. International Press, Sommerville, 1999, 69–87.

R. Langlands shows, in analogy with Artin's original treatment of one-dimensional *p*, that at least for tetrahedral *p*, L(s, *p*) is equal to the L-function L(s, π) attached to a cuspdidal automorphic representation of the group GL(2, /A), /A being the adéle ring of the field, and L(s, π), whose definition is ultimately due to Hecke, is known to be entire. The main result, from which the existence of π follows, is that it is always possible to transfer automorphic representations of GL(2) over one number field to representations over a cyclic extension of the field. The tools he employs here are the trace formula and harmonic analysis on the group GL(2) over a local field.