Dual conformal invariant kinematics and folding of Grassmannian cluster algebras

Abstract

In quantum field theory study, Grassmannian manifolds Gr(4,n) are closely related to D=4 kinematics input for n-particle scattering processes, whose combinatorial and geometrical structures have been widely applied in studying conformal invariant physical theories and their scattering amplitudes. Recently, HLY21 observed that constraining D=4 kinematics input to its D=3 subspace can be interpreted as folding Grassmannian cluster algebras C[Gr(4,n)]. In this paper, we deduce general expressions for these constraints in terms of Pl\"ucker variables of Gr(4,n) directly from D=3 subspace definition, and propose a series of initial quivers for algebra C[Gr(4,n)] whose folding conditions exactly meet the constraints, which proves the observation finally.