English

Singular Solutions in Soft Limits

High Energy Physics - Theory 2020-06-24 v2 Mathematical Physics Combinatorics math.MP

Abstract

A generalization of the scattering equations on X(2,n)X(2,n), the configuration space of nn points on CP1\mathbb{CP}^1, to higher dimensional projective spaces was recently introduced by Early, Guevara, Mizera, and one of the authors. One of the new features in X(k,n)X(k,n) with k>2k>2 is the presence of both regular and singular solutions in a soft limit. In this work we study soft limits in X(3,7)X(3,7), X(4,7)X(4,7), X(3,8)X(3,8) and X(5,8)X(5,8), find all singular solutions, and show their geometrical configurations. More explicitly, for X(3,7)X(3,7) and X(4,7)X(4,7) we find 180180 and 120120 singular solutions which when added to the known number of regular solutions both give rise to 12721\, 272 solutions as it is expected since X(3,7)X(4,7)X(3,7)\sim X(4,7). Likewise, for X(3,8)X(3,8) and X(5,8)X(5,8) we find 5964059\, 640 and 5880058\, 800 singular solutions which when added to the regular solutions both give rise to 188112188\, 112 solutions. We also propose a classification of all configurations that can support singular solutions for general X(k,n)X(k,n) and comment on their contribution to soft expansions of generalized biadjoint amplitudes.

Cite

@article{arxiv.1911.02594,
  title  = {Singular Solutions in Soft Limits},
  author = {Freddy Cachazo and Bruno Umbert and Yong Zhang},
  journal= {arXiv preprint arXiv:1911.02594},
  year   = {2020}
}

Comments

27 + 7 pages, 14 figures, v2: added reference and cross-list with math.co

R2 v1 2026-06-23T12:07:51.198Z