Notes on su(1,2)(1) Chern-Simons theory and Torsional Newton-Cartan gravity

Abstract

In this study, we investigate three-dimensional torsional Newton-Cartan (TNC) gravity by gauging the su(1,2)(1) algebra and construct its action using the Chern-Simons theory. This TNC exhibits novel features, including the fact that the gauge fields associated with both dilatation and rotation symmetries transform non-trivially under Galilean boosts. This theory also reproduces the Schr\"odinger gravity acquired by gauging the extended z=2 Schr\"odinger algebra arXiv:1604.08054 via a large speed of light (1/c)-expansion. In particular, we explain that the z=2 Lifshitz vacuum solution appearing in Schr\"odinger gravity is related to the null reduction of 4d -background up to a conformal factor. Based on these results, we revisit the identification between the extended Schr\"odinger algebra and bosonic analogue of super BMS algebra arXiv:1905.13154. We interpret that this relation originates from the W3(2) algebra which acts as the bosonic analogue of N=2 superconformal algebra.