Scattering Equations: Real Solutions and Particles on a Line

Abstract

We find n(n-3)/2-dimensional regions of the space of kinematic invariants, where all the solutions to the scattering equations (the core of the CHY formulation of amplitudes) for n massless particles are real. On these regions, the scattering equations are equivalent to the problem of finding stationary points of n-3 mutually repelling particles on a finite real interval with appropriate boundary conditions. This identification directly implies that for each of the (n-3)! possible orderings of the n-3 particles on the interval, there exists one stable stationary point. Furthermore, restricting to four dimensions, we find that the separation of the solutions into k∈ \2,3,… ,n-2\ sectors naturally matches that of permutations of n-3 labels into those with k-2 descents. This leads to a physical realization of the combinatorial meaning of the Eulerian numbers.