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arxiv: 0908.2809 · v4 · pith:5UBXQN53new · submitted 2009-08-20 · ✦ hep-th · gr-qc· hep-ph

Emergent Geometry from Quantized Spacetime

classification ✦ hep-th gr-qchep-ph
keywords algebrageometrysnyderspacetimed-dimensionalemergentmass-deformedmatrix
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We examine the picture of emergent geometry arising from a mass-deformed matrix model. Because of the mass-deformation, a vacuum geometry turns out to be a constant curvature spacetime such as d-dimensional sphere and (anti-)de Sitter spaces. We show that the mass-deformed matrix model giving rise to the constant curvature spacetime can be derived from the d-dimensional Snyder algebra. The emergent geometry beautifully confirms all the rationale inferred from the algebraic point of view that the d-dimensional Snyder algebra is equivalent to the Lorentz algebra in (d+1)-dimensional {\it flat} spacetime. For example, a vacuum geometry of the mass-deformed matrix model is completely described by a G-invariant metric of coset manifolds G/H defined by the Snyder algebra. We also discuss a nonlinear deformation of the Snyder algebra.

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