Heat kernel for flat generalized Laplacians with anisotropic scaling
arXiv:1308.2706 · doi:10.1063/1.4882157
Abstract
We calculate the closed analytic form of the solution of heat kernel equation for the anisotropic generalizations of flat Laplacian. We consider a UV as well as UV/IR interpolating generalizations. In all cases, the result can be expressed in terms of Fox-Wright psi-functions. We perform different consistency checks, analytically reproducing some of the previous numerical or qualitative results, such as spectral dimension flow. Our study should be considered as a first step towards the construction of a heat kernel for curved HoÅava-Lifshitz geometries, which is an essential ingredient in the spectral action approach to the construction of the HoÅava-Lifshitz gravity.
14 pages, 1 figure