Chern-Simons propagators in AdS$_3$
Abstract
We introduce parity-odd spin-1 harmonic functions in AdS and study their properties. We demonstrate that such parity-odd harmonics are related to their parity-even counterparts through the action of a `Chern-Simons operator', which we present as a novelty in this paper. This relation leads to the construction of simultaneous eigen-functions of the Laplacian and the Chern-Simons operators. Subsequently, these harmonic functions are employed to construct propagators in pure abelian Chern-Simons theory as well as Maxwell-Chern-Simons theory in a covariant gauge. We demonstrate the consistency of the Chern-Simons propagator with the expected two-point function of the boundary currents. Our results are built upon the embedding formalism, which we modify suitably to incorporate parity-odd structures. This formalism also readily helps us write down parity odd structures for the propagators of higher-spin fields. Finally, we construct a split representation for the parity-odd harmonic functions, which may be useful to compute Witten diagrams with loops. Our results are expected to be useful in perturbative studies of parity violating QFTs on AdS.
Keywords
Cite
@article{arxiv.2512.07752,
title = {Chern-Simons propagators in AdS$_3$},
author = {Jyotirmoy Bhattacharya and Anurag Guria and Shiroman Prakash and Aditya Sharma and Tarun Sharma},
journal= {arXiv preprint arXiv:2512.07752},
year = {2025}
}
Comments
34+1 pages