NewEvery arXiv paper, its researchers & institutions — mapped.
paper

Noncommutative spherically symmetric spacetimes at semiclassical order

arXiv:1611.04971 · doi:10.1088/1361-6382/aa72a5

Abstract

Working within the recent formalism of Poisson-Riemannian geometry, we completely solve the case of generic spherically symmetric metric and spherically symmetric Poisson-bracket to find a unique answer for the quantum differential calculus, quantum metric and quantum Levi-Civita connection at semiclassical order $O(λ)$. Here $λ$ is the deformation parameter, plausibly the Planck scale. We find that $r,t,dr,dt$ are all forced to be central, i.e. undeformed at order $λ$, while for each value of $r,t$ we are forced to have a fuzzy sphere of radius $r$ with a unique differential calculus which is necessarily nonassociative at order $λ^2$. We give the spherically symmetric quantisation of the FLRW cosmology in detail and also recover a previous analysis for the Schwarzschild black hole, now showing that the quantum Ricci tensor for the latter vanishes at order $λ$. The quantum Laplace-Beltrami operator for spherically symmetric models turns out to be undeformed at order $λ$ while more generally in Poisson-Riemannian geometry we show that it deforms to \[ \square f+{λ\over 2}ω^{αβ}({\rm Ric}^γ_α-S^γ_{;α})(\widehat\nabla_βd f)_γ+ O(λ^2)\] in terms of the classical Levi-Civita connection $\widehat\nabla$, the contorsion tensor $S$, the Poisson-bivector $ω$ and the Ricci curvature of the Poisson-connection that controls the quantum differential structure. The Majid-Ruegg spacetime $[x,t]=λx$ with its standard calculus and unique quantum metric provides an example with nontrivial correction to the Laplacian at order $λ$.

47 pages 1 figure