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- Hypertoric_variety abstract "In mathematics, a hypertoric variety or toric hyperkähler variety is a quaternionic analog of a toric variety constructed by applying the hyper-Kähler quotient construction of N. J. Hitchin, A. Karlhede, and U. Lindström et al. (1987) to a torus acting on a quaternionic vector space. Roger Bielawski and Andrew S. Dancer (2000) gave a systematic description of hypertoric varieties.".
- Hypertoric_variety wikiPageExternalLink short.pdf.
- Hypertoric_variety wikiPageID "39272241".
- Hypertoric_variety wikiPageRevisionID "553242466".
- Hypertoric_variety first "A.".
- Hypertoric_variety first "Andrew S.".
- Hypertoric_variety first "M.".
- Hypertoric_variety first "N. J.".
- Hypertoric_variety first "Roger".
- Hypertoric_variety first "U.".
- Hypertoric_variety last "Bielawski".
- Hypertoric_variety last "Dancer".
- Hypertoric_variety last "Hitchin".
- Hypertoric_variety last "Karlhede".
- Hypertoric_variety last "Lindström".
- Hypertoric_variety last "Roček".
- Hypertoric_variety year "1987".
- Hypertoric_variety year "2000".
- Hypertoric_variety subject Category:Algebraic_geometry.
- Hypertoric_variety comment "In mathematics, a hypertoric variety or toric hyperkähler variety is a quaternionic analog of a toric variety constructed by applying the hyper-Kähler quotient construction of N. J. Hitchin, A. Karlhede, and U. Lindström et al. (1987) to a torus acting on a quaternionic vector space. Roger Bielawski and Andrew S. Dancer (2000) gave a systematic description of hypertoric varieties.".
- Hypertoric_variety label "Hypertoric variety".
- Hypertoric_variety sameAs m.0t_fksv.
- Hypertoric_variety sameAs Q16972475.
- Hypertoric_variety sameAs Q16972475.
- Hypertoric_variety wasDerivedFrom Hypertoric_variety?oldid=553242466.
- Hypertoric_variety isPrimaryTopicOf Hypertoric_variety.