fbpx
Wikipedia

Gibbons–Hawking space

December 14, 2023

In mathematical physics, a Gibbons–Hawking space, named after Gary Gibbons and Stephen Hawking, is essentially a hyperkähler manifold with an extra U(1) symmetry.[1] (In general, Gibbons–Hawking metrics are a subclass of hyperkähler metrics.[2]) Gibbons–Hawking spaces, especially ambipolar ones,[3] find an application in the study of black hole microstate geometries.[1][4]

See also edit

References edit

  1. ^ a b Mathur, Samir D. (22 January 2009). "The fuzzball paradigm for black holes: FAQ" (PDF). Ohio State University. p. 20. Retrieved 16 April 2012.
  2. ^ Wang, Chih-Wei (2007). Five Dimensional Microstate Geometries. p. 67. ISBN 978-0-549-39022-0. Retrieved 16 April 2012.
  3. ^ Bellucci, Stefano (2008). Supersymmetric Mechanics: Attractors and Black Holes in Supersymmetric Gravity. Springer. p. 5. ISBN 978-3-540-79522-3. Retrieved 16 April 2012.
  4. ^ Bena, Iosif; Nikolay Bobev; Stefano Giusto; Clement Ruefa; Nicholas P. Warner (March 2011). "An infinite-dimensional family of black-hole microstate geometries". Journal of High Energy Physics. International School for Advanced Studies.!. 3 (22): 22. arXiv:1006.3497. Bibcode:2011JHEP...03..022B. doi:10.1007/JHEP03(2011)022.

December 14, 2023
gibbons, hawking, space, this, article, technical, most, readers, understand, please, help, improve, make, understandable, experts, without, removing, technical, details, december, 2012, learn, when, remove, this, template, message, mathematical, physics, name. This article may be too technical for most readers to understand Please help improve it to make it understandable to non experts without removing the technical details December 2012 Learn how and when to remove this template message In mathematical physics a Gibbons Hawking space named after Gary Gibbons and Stephen Hawking is essentially a hyperkahler manifold with an extra U 1 symmetry 1 In general Gibbons Hawking metrics are a subclass of hyperkahler metrics 2 Gibbons Hawking spaces especially ambipolar ones 3 find an application in the study of black hole microstate geometries 1 4 See also editGibbons Hawking effectReferences edit a b Mathur Samir D 22 January 2009 The fuzzball paradigm for black holes FAQ PDF Ohio State University p 20 Retrieved 16 April 2012 Wang Chih Wei 2007 Five Dimensional Microstate Geometries p 67 ISBN 978 0 549 39022 0 Retrieved 16 April 2012 Bellucci Stefano 2008 Supersymmetric Mechanics Attractors and Black Holes in Supersymmetric Gravity Springer p 5 ISBN 978 3 540 79522 3 Retrieved 16 April 2012 Bena Iosif Nikolay Bobev Stefano Giusto Clement Ruefa Nicholas P Warner March 2011 An infinite dimensional family of black hole microstate geometries Journal of High Energy Physics International School for Advanced Studies 3 22 22 arXiv 1006 3497 Bibcode 2011JHEP 03 022B doi 10 1007 JHEP03 2011 022 Retrieved from https en wikipedia org w index php title Gibbons Hawking space amp oldid 1054459123, wikipedia, wiki, book, books, library,

article

, read, download, free, free download, mp3, video, mp4, 3gp, jpg, jpeg, gif, png, picture, music, song, movie, book, game, games.