On spectral geometry approach to Horava-Lifshitz gravity: Spectral dimension
arXiv:1010.5831 · doi:10.1088/0264-9381/28/19/195005
Abstract
We initiate the study of Horava-Lifshitz models of gravity in the framework of spectral geometry. As the first step, we calculate the dimension of space-time. It is shown, that for the natural choice of a Dirac operator (or rather corresponding generalized Laplacian), which respects both the foliation structure and anisotropic scaling, the result of Horava on a spectral dimension is reproduced for an arbitrary, non-flat space-time. The advantage and further applications of our approach are discussed.
References, a figure and minor clarifications added. To match the version to be published in CQG