Scattering Equations: From Projective Spaces to Tropical Grassmannians

Abstract

We introduce a natural generalization of the scattering equations, which connect the space of Mandelstam invariants to that of points on CP1, to higher-dimensional projective spaces CPk-1. The standard, k=2 Mandelstam invariants, sab, are generalized to completely symmetric tensors sa1a2… ak subject to a `massless' condition sa1a2·s ak-2\,b\,b=0 and to `momentum conservation'. The scattering equations are obtained by constructing a potential function and computing its critical points. We mainly concentrate on the k=3 case: study solutions and define the generalization of biadjoint scalar amplitudes. We compute all `biadjoint amplitudes' for (k,n)=(3,6) and find a direct connection to the tropical Grassmannian. This leads to the notion of k=3 Feynman diagrams. We also find a concrete realization of the new kinematic spaces, which coincides with the spinor-helicity formalism for k=2, and provides analytic solutions analogous to the MHV ones.