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Paper detail

Notes on Emergent Gravity

Emergent gravity is aimed at constructing a Riemannian geometry from U(1) gauge fields on a noncommutative spacetime. But this construction can be inverted to find corresponding U(1) gauge fields on a (generalized) Poisson manifold given a Riemannian metric (M, g). We examine this bottom-up approach with the LeBrun metric which is the most general scalar-flat Kahler metric with a U(1) isometry and contains the Gibbons-Hawking metric, the real heaven as well as the multi-blown up Burns metric which is a scalar-flat Kahler metric on C^2 with n points blown up. The bottom-up approach clarifies some important issues in emergent gravity.

preprint2012arXivOpen access
Sunggeun LeeRaju RoychowdhuryHyun Seok Yang
math-phmath.MPgr-qchep-th
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Sunggeun LeeRaju RoychowdhuryHyun Seok Yang

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