Journal of High Energy Physics (Nov 2022)
Causal diamonds, cluster polytopes and scattering amplitudes
Abstract
Abstract The “amplituhedron” for tree-level scattering amplitudes in the bi-adjoint ϕ 3 theory is given by the ABHY associahedron in kinematic space, which has been generalized to give a realization for all finite-type cluster algebra polytopes, labelled by Dynkin diagrams. In this letter we identify a simple physical origin for these polytopes, associated with an interesting (1 + 1)-dimensional causal structure in kinematic space, along with solutions to the wave equation in this kinematic “spacetime” with a natural positivity property. The notion of time evolution in this kinematic spacetime can be abstracted away to a certain “walk”, associated with any acyclic quiver, remarkably yielding a finite cluster polytope for the case of Dynkin quivers. The A $$ \mathcal{A} $$ n−3 , B $$ \mathcal{B} $$ n−1 / C $$ \mathcal{C} $$ n−1 and D $$ \mathcal{D} $$ n polytopes are the amplituhedra for n-point tree amplitudes, one-loop tadpole diagrams, and full integrand of one-loop amplitudes. We also introduce a polytope D ¯ $$ \overline{\mathcal{D}} $$ n , which chops the D $$ \mathcal{D} $$ n polytope in half along a symmetry plane, capturing one-loop amplitudes in a more efficient way.
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