A Soft Theorem for the Tropical Grassmannian

Abstract

We study the soft limit of a recently proposed generalization of the biadjoint scalar amplitudes m(k)n, which have been conjectured to have a relation to the tropical Grassmannian Tr G(k,n). Using the CHY formulation along with the Global Residue Theorem, we prove the soft factorization for m(k)n amplitudes for arbitrary k and n. We find that the soft factors are in direct correspondence to vertices of the associahedron Ak-1, and hence take the form of m(2)n amplitudes. This entails that all scattering amplitudes of the ordinary biadjoint scalar theory can be interpreted as an infinite family of soft factors. Additionally, Grassmannian duality reveals that generalized amplitudes m(k)n with k>2 satisfy not only a soft theorem, but also a non-trivial "hard" theorem. We perform numerical checks of our theorems against previous results for Tr G(4,7) and Tr G(5,8), thereby providing strong evidence of their relation with the CHY formulation.