Bound of Noncommutativity Parameter Based on Black Hole Entropy
arXiv:1005.0459 · doi:10.1142/S0217732310034237
Abstract
We study the bound of the noncommutativity parameter in the noncommutative Schwarzschild black hole which is a solution of the noncommutative ISO(3,1) Poincare gauge group. The statistical entropy satisfying the area law in the brick wall method yields a cutoff relation which depends on the noncommutativity parameter. Requiring both the cutoff parameter and the noncommutativity parameter to be real, the noncommutativity parameter can be shown to be bounded as $Î> 8.4\ times 10^{-2}l_{p}$.
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