Gauge supergravity in $D=2+2$
Abstract
We present an action for chiral supergravity in dimensions. The fields of the theory are organized into an connection supermatrix, and are given by the usual vierbein , spin connection , and Majorana gravitino . In analogy with a construction used for gauge supergravity, the action is given by , where is the curvature supermatrix two-form, and a constant supermatrix containing . It is similar, but not identical to the MacDowell-Mansouri action for supergravity. The constant supermatrix breaks gauge invariance to a subalgebra , including a Majorana-Weyl supercharge. Thus half of the gauge supersymmetry survives. The gauge fields are the selfdual part of and the Weyl projection of for , and the antiselfdual part of for . Supersymmetry transformations, being part of a gauge superalgebra, close off-shell. The selfduality condition on the spin connection can be consistently imposed, and the resulting "projected" action is gauge invariant.
Cite
@article{arxiv.1707.03411,
title = {Gauge supergravity in $D=2+2$},
author = {Leonardo Castellani},
journal= {arXiv preprint arXiv:1707.03411},
year = {2017}
}
Comments
LaTeX, 10 pages