English

The most complete mass-dimension four topological gravity

General Physics 2021-03-30 v3

Abstract

The usual Chern-Simons extension of Einstein gravity theory consists in adding a squared Riemann contribution to the Hilbert Lagrangian, which means that a square-curvature term is added to the linear-curvature leading term governing the dynamics of the gravitational field. However, in such a way the Lagrangian consists of two terms with a different number of curvatures, and therefore not homogeneous. To develop a homogeneous Chern-Simons correction to Einstein gravity we may, on the one hand, use the above-mentioned square-curvature contribution as the correction for the most general square-curvature Lagrangian, or on the other hand, find some linear-curvature correction to the Hilbert Lagrangian. In the first case, we will present the most general square-curvature leading term, which is in fact the already-known re-normalizable Stelle Lagrangian. In the second case, the topological current has to be an axial-vector built only in terms of gravitational degrees of freedom and with a unitary mass dimension, and we will display such an object. The comparison of the two theories will eventually be commented.

Keywords

Cite

@article{arxiv.2004.04051,
  title  = {The most complete mass-dimension four topological gravity},
  author = {Luca Fabbri},
  journal= {arXiv preprint arXiv:2004.04051},
  year   = {2021}
}

Comments

7 pages

R2 v1 2026-06-23T14:44:24.089Z