Chern-Simons and Born-Infeld gravity theories and Maxwell algebras type

Abstract

Recently was shown that standard odd and even-dimensional General Relativity can be obtained from a (2n+1)-dimensional Chern-Simons Lagrangian invariant under the B2n+1 algebra and from a (2n)-dimensional Born-Infeld Lagrangian invariant under a subalgebra LB2n+1 respectively. Very Recently, it was shown that the generalized In\"on\"u-Wigner contraction of the generalized AdS-Maxwell algebras provides Maxwell algebras types Mm which correspond to the so called Bm Lie algebras. In this article we report on a simple model that suggests a mechanism by which standard odd-dimensional General Relativity may emerge as a weak coupling constant limit of a (2p+1)-dimensional Chern-Simons Lagrangian invariant under the Maxwell algebra type M2m+1, if and only if m≥ p. Similarly, we show that standard even-dimensional General Relativity emerges as a weak coupling constant limit of a (2p)-dimensional Born-Infeld type Lagrangian invariant under a subalgebra LM2m of the Maxwell algebra type, if and only if m≥ p. It is shown that when m<p this is not possible for a (2p+1)-dimensional Chern-Simons Lagrangian invariant under the M2m+1 and for a (2p)-dimensional Born-Infeld type Lagrangian invariant under LM2m algebra.