About: Weil's conjecture on Tamagawa numbers

Facets (new session)
Description
Metadata
Settings
- Rule:
- Inverse Functional Properties:
- "Same As":

About: Weil's conjecture on Tamagawa numbers Goto Sponge NotDistinct Permalink

An Entity of Type : owl:Thing, within Data Space : dbpedia.org associated with source document(s)
QRcode icon

http://dbpedia.org/describe/?url=http%3A%2F%2Fdbpedia.org%2Fresource%2FWeil%27s_conjecture_on_Tamagawa_numbers

In mathematics, the Weil conjecture on Tamagawa numbers is the statement that the Tamagawa number of a simply connected simple algebraic group defined over a number field is 1. In this case, simply connected means "not having a proper algebraic covering" in the algebraic group theory sense, which is not always the topologists' meaning.

Attributes	Values
rdfs:label	Weil's conjecture on Tamagawa numbers (en)
rdfs:comment	In mathematics, the Weil conjecture on Tamagawa numbers is the statement that the Tamagawa number of a simply connected simple algebraic group defined over a number field is 1. In this case, simply connected means "not having a proper algebraic covering" in the algebraic group theory sense, which is not always the topologists' meaning. (en)
dcterms:subject	Algebraic groups Conjectures Theorems in group theory Diophantine geometry
Wikipage page ID	3036289 (xsd:integer)
Wikipage revision ID	1019240313 (xsd:integer)
Link from a Wikipage to another Wikipage	Algebraic group Annals of Mathematics Robert Langlands Algebraic groups Conjectures Mathematics Classical group Dennis Gaitsgory Harmonic analysis Spin group Theorems in group theory Hasse principle American Mathematical Society Diophantine geometry Simply connected space Jacob Lurie Chevalley group Group theory Smith–Minkowski–Siegel mass formula Tamagawa number Simply connected Quasisplit reductive group E8 (group) Strong approximation in algebraic groups
Link from a Wikipage to an external page	https://www.cornell.edu/video/jacob-lurie-the-siegel-mass-formula https://arxiv.org/abs/0801.4733 https://books.google.com/books%3Fid=vQvvAAAAMAAJ http://www.numdam.org/item%3Fid=SB_1958-1960__5__249_0 http://www.math.harvard.edu/~lurie/282y.html http://www.numdam.org/item%3Fid=CM_1980__41_2_153_0%7Cmr=581580
sameAs	Weil's conjecture on Tamagawa numbers Weil's conjecture on Tamagawa numbers Weil's conjecture on Tamagawa numbers
dbp:wikiPageUsesTemplate	dbt:Springer dbt:Citation dbt:Harvtxt dbt:Reflist dbt:Sfn dbt:Short_description dbt:Harvs
id	T/t092060 (en)
title	Tamagawa number (en)
has abstract	In mathematics, the Weil conjecture on Tamagawa numbers is the statement that the Tamagawa number of a simply connected simple algebraic group defined over a number field is 1. In this case, simply connected means "not having a proper algebraic covering" in the algebraic group theory sense, which is not always the topologists' meaning. (en)
prov:wasDerivedFrom	wikipedia-en:Weil's_conjecture_on_Tamagawa_numbers?oldid=1019240313&ns=0
page length (characters) of wiki page	5379 (xsd:nonNegativeInteger)
foaf:isPrimaryTopicOf	wikipedia-en:Weil's_conjecture_on_Tamagawa_numbers
is Link from a Wikipage to another Wikipage of	List of conjectures Basel problem Linear algebraic group Reductive group Pi The Weil conjecture on Tamagawa numbers Weil conjecture on Tamagawa numbers Tamagawa number Tamagawa measure Weil conjecture about Tamagawa numbers Weil conjecture for Tamagawa numbers
is Wikipage redirect of	The Weil conjecture on Tamagawa numbers Weil conjecture on Tamagawa numbers Tamagawa measure Weil conjecture about Tamagawa numbers Weil conjecture for Tamagawa numbers
is foaf:primaryTopic of	wikipedia-en:Weil's_conjecture_on_Tamagawa_numbers

Faceted Search & Find service v1.17_git139 as of Feb 29 2024

Alternative Linked Data Documents: ODE Content Formats:

RDF

ODATA

Microdata

About

OpenLink Virtuoso version 08.03.3330 as of Mar 19 2024, on Linux (x86_64-generic-linux-glibc212), Single-Server Edition (61 GB total memory, 49 GB memory in use)
Data on this page belongs to its respective rights holders.
Virtuoso Faceted Browser Copyright © 2009-2024 OpenLink Software