$(2,2)$ Scattering and the Celestial Torus
Abstract
Analytic continuation from Minkowski space to split signature spacetime has proven to be a powerful tool for the study of scattering amplitudes. Here we show that, under this continuation, null infinity becomes the product of a null interval with a celestial torus (replacing the celestial sphere) and has only one connected component. Spacelike and timelike infinity are time-periodic quotients of AdS. These three components of infinity combine to an represented as a toric fibration over the interval. Privileged scattering states of scalars organize into conformal primary wave functions and their descendants with real integral or half-integral conformal weights, giving the normally continuous scattering problem a discrete character.
Cite
@article{arxiv.2101.09591,
title = {$(2,2)$ Scattering and the Celestial Torus},
author = {Alexander Atanasov and Adam Ball and Walker Melton and Ana-Maria Raclariu and Andrew Strominger},
journal= {arXiv preprint arXiv:2101.09591},
year = {2021}
}
Comments
19 pages, 1 figure