Towards Positive Geometry of Multi Scalar Field Amplitudes : Accordiohedron and Effective Field Theory

Abstract

The geometric structure of S-matrix encapsulated by the "Amplituhedron program" has begun to reveal itself even in non-supersymmetric quantum field theories. Starting with the seminal work of Arkani-Hamed, Bai, He and Yan it is now understood that for a wide class of scalar quantum field theories, tree-level amplitudes are canonical forms associated to polytopes known as accordiohedra. Similarly the higher loop scalar integrands are canonical forms associated to so called type-D cluster polytopes for cubic interactions or recently discovered class of polytopes termed pseudo-accordiohedron for higher order scalar interactions. In this paper, we continue to probe the universality of these structures for a wider class of scalar quantum field theories. More in detail, we discover new realisations of the associahedron in planar kinematic space whose canonical forms generate (colour-ordered) tree-level S matrix of external massless particles with n-4 massless poles and one massive pole at m2. The resulting amplitudes are associated to λ1\, φ13\, +\, λ2\, φ12φ2 potential where φ1 and φ2 are massless and massive scalar fields with bi-adjoint colour indices respectively. We also show how in the "decoupling limit" (where m → ∞, λ2 → ∞ such that g := λ2m = finite) these associahedra project onto a specific class of accordiohedron which are known to be positive geometries of amplitudes generated by λ φ13 + g φ14.