About: Atiyah–Hitchin–Singer theorem

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In differential geometry and gauge theory, the Atiyah–Hitchin–Singer theorem, introduced by Michael Atiyah, Nigel Hitchin, and Isadore Singer , states that the space of SU(2) anti self dual Yang–Mills fields on a 4-sphere with index k > 0 has dimension 8k – 3.

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  • In differential geometry and gauge theory, the Atiyah–Hitchin–Singer theorem, introduced by Michael Atiyah, Nigel Hitchin, and Isadore Singer , states that the space of SU(2) anti self dual Yang–Mills fields on a 4-sphere with index k > 0 has dimension 8k – 3. (en)
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  • 37663200 (xsd:integer)
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  • 1670 (xsd:nonNegativeInteger)
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  • 1039693806 (xsd:integer)
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dbp:author1Link
  • Michael Atiyah (en)
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  • Nigel Hitchin (en)
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  • Isadore Singer (en)
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  • Michael (en)
  • Isadore (en)
  • Nigel (en)
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  • Hitchin (en)
  • Singer (en)
  • Atiyah (en)
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dbp:year
  • 1977 (xsd:integer)
  • 1978 (xsd:integer)
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  • In differential geometry and gauge theory, the Atiyah–Hitchin–Singer theorem, introduced by Michael Atiyah, Nigel Hitchin, and Isadore Singer , states that the space of SU(2) anti self dual Yang–Mills fields on a 4-sphere with index k > 0 has dimension 8k – 3. (en)
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  • Atiyah–Hitchin–Singer theorem (en)
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