Almost commutative Riemannian geometry: wave operators
Abstract
Associated to any (pseudo)-Riemannian manifold of dimension is an -dimensional noncommutative differential structure on the manifold, with the extra dimension encoding the classical Laplacian as a noncommutative `vector field'. We use the classical connection, Ricci tensor and Hodge Laplacian to construct and a natural noncommutative torsion free connection on . We show that its generalised braiding obeys the quantum Yang-Baxter or braid relations only when the original is flat, i.e their failure is governed by the Riemann curvature, and that only when is Einstein. We show that if has a conformal Killing vector field then the cross product algebra viewed as a noncommutative analogue of has a natural -dimensional calculus extending and a natural spacetime Laplacian now directly defined by the extra dimension. The case recovers the Majid-Ruegg bicrossproduct flat spacetime model and the wave-operator used in its variable speed of light preduction, but now as an example of a general construction. As an application we construct the wave operator on a noncommutative Schwarzschild black hole and take a first look at its features. It appears that the infinite classical redshift/time dilation factor at the event horizon is made finite.
Cite
@article{arxiv.1009.2201,
title = {Almost commutative Riemannian geometry: wave operators},
author = {Shahn Majid},
journal= {arXiv preprint arXiv:1009.2201},
year = {2015}
}
Comments
39 pages, 4 pdf images. Removed previous Sections 5.1-5.2 to a separate paper (now ArXived) to meet referee length requirements. Corresponding slight restructure but no change to remaining content