In mathematics, the Atiyah–Jones conjecture is a conjecture about the homology of the moduli spaces of instantons. The original form of the conjecture considered instantons over a 4 dimensional sphere. It was introduced by Michael Francis Atiyah and John D. S. Jones and proved by Charles P. Boyer, Jacques C. Hurtubise, and Benjamin M. Mann et al. . The more general version of the Atiyah–Jones conjecture is a question about the homology of the moduli spaces of instantons on any 4 dimensional real manifold, or on a complex surface. The Atiyah–Jones conjecture has been proved for Ruled Surfaces by R. J. Milgram and J. Hurtubise, and for Rational Surfaces by Elizabeth Gasparim. The conjecture remains unproved for other types of 4 manifolds.
Attributes | Values |
---|
rdfs:label
| - حدسية عطية - جونز (ar)
- Atiyah–Jones conjecture (en)
|
rdfs:comment
| - في الرياضيات، تعد حدسية عطية - جونز (بالإنجليزية :Atiyah–Jones conjecture) حدسية تتعلق بتماثل الوحدات الفراغية (moduli space) الخاصة بالجزيئيات الزائفة على الكرة. التي قدمها مايكل عطية و J. D. S. Jones (1978) وأثبتها Charles P. Boyer, J. C. Hurtubise, و B. M. Mann et al. (1992, 1993). (ar)
- In mathematics, the Atiyah–Jones conjecture is a conjecture about the homology of the moduli spaces of instantons. The original form of the conjecture considered instantons over a 4 dimensional sphere. It was introduced by Michael Francis Atiyah and John D. S. Jones and proved by Charles P. Boyer, Jacques C. Hurtubise, and Benjamin M. Mann et al. . The more general version of the Atiyah–Jones conjecture is a question about the homology of the moduli spaces of instantons on any 4 dimensional real manifold, or on a complex surface. The Atiyah–Jones conjecture has been proved for Ruled Surfaces by R. J. Milgram and J. Hurtubise, and for Rational Surfaces by Elizabeth Gasparim. The conjecture remains unproved for other types of 4 manifolds. (en)
|
dcterms:subject
| |
Wikipage page ID
| |
Wikipage revision ID
| |
Link from a Wikipage to another Wikipage
| |
Link from a Wikipage to an external page
| |
sameAs
| |
dbp:wikiPageUsesTemplate
| |
mr
| |
authorlink
| |
first
| - Charles P. (en)
- Michael Francis (en)
- R. James (en)
- Benjamin M. (en)
- Jacques C. (en)
- John D. S. (en)
|
ISSN
| |
issue
| |
last
| - Boyer (en)
- Jones (en)
- Mann (en)
- Atiyah (en)
- Hurtubise (en)
- Milgram (en)
|
pages
| |
title
| - Topological aspects of Yang-Mills theory (en)
|
url
| |
volume
| |
year
| |
has abstract
| - في الرياضيات، تعد حدسية عطية - جونز (بالإنجليزية :Atiyah–Jones conjecture) حدسية تتعلق بتماثل الوحدات الفراغية (moduli space) الخاصة بالجزيئيات الزائفة على الكرة. التي قدمها مايكل عطية و J. D. S. Jones (1978) وأثبتها Charles P. Boyer, J. C. Hurtubise, و B. M. Mann et al. (1992, 1993). (ar)
- In mathematics, the Atiyah–Jones conjecture is a conjecture about the homology of the moduli spaces of instantons. The original form of the conjecture considered instantons over a 4 dimensional sphere. It was introduced by Michael Francis Atiyah and John D. S. Jones and proved by Charles P. Boyer, Jacques C. Hurtubise, and Benjamin M. Mann et al. . The more general version of the Atiyah–Jones conjecture is a question about the homology of the moduli spaces of instantons on any 4 dimensional real manifold, or on a complex surface. The Atiyah–Jones conjecture has been proved for Ruled Surfaces by R. J. Milgram and J. Hurtubise, and for Rational Surfaces by Elizabeth Gasparim. The conjecture remains unproved for other types of 4 manifolds. (en)
|
author1-link
| |
author2-link
| |
journal
| |
gold:hypernym
| |
prov:wasDerivedFrom
| |
page length (characters) of wiki page
| |
foaf:isPrimaryTopicOf
| |
is Link from a Wikipage to another Wikipage
of | |
is Wikipage redirect
of | |
is known for
of | |
is known for
of | |
is foaf:primaryTopic
of | |