English

Ricci Flow Conjugated Initial Data Sets for Einstein Equations

General Relativity and Quantum Cosmology 2010-12-15 v2 Mathematical Physics Differential Geometry math.MP

Abstract

We discuss a natural form of Ricci--flow conjugation between two distinct general relativistic data sets given on a compact n3n\geq 3-dimensional manifold Σ\Sigma. We establish the existence of the relevant entropy functionals for the matter and geometrical variables, their monotonicity properties, and the associated convergence in the appropriate sense. We show that in such a framework there is a natural mode expansion generated by the spectral resolution of the Ricci conjugate Hodge--DeRham operator. This mode expansion allows to compare the two distinct data sets and gives rise to a computable heat kernel expansion of the fluctuations among the fields defining the data. In particular this shows that Ricci flow conjugation entails a form of L2L^2 averaging of one data set with respect to the other with a number of desiderable properties: (i) It preserves the dominant energy condition; (ii) It is localized by a heat kernel whose support sets the scale of averaging; (iii) It is characterized by a set of balance functionals which allow the analysis of its entropic stability.

Keywords

Cite

@article{arxiv.1006.1500,
  title  = {Ricci Flow Conjugated Initial Data Sets for Einstein Equations},
  author = {Mauro Carfora},
  journal= {arXiv preprint arXiv:1006.1500},
  year   = {2010}
}

Comments

74 pages, 22 figures added, submitted version. The paper has been vastly expanded with a new detailed introduction and with added results on the asymptotics of the Ricci flow averaged data. This work is partly based on the lectures of the author at the GGI School "Coarse--Grained Cosmology", Florence January 26--29, 2009

R2 v1 2026-06-21T15:33:18.970Z