Parke-Taylor varieties

Abstract

Parke-Taylor functions are certain rational functions on the Grassmannian of lines encoding MHV amplitudes in particle physics. For n particles there are n! Parke-Taylor functions, corresponding to all orderings of the particles. Linear relations between these functions have been extensively studied in the last years. We here describe all non-linear polynomial relations between these functions in a simple combinatorial way and study the variety parametrized by them, called the Parke-Taylor variety. We show that the Parke-Taylor variety is linearly isomorphic to the log canonical embedding of the moduli space M0,n due to Keel and Tevelev, and that the intersection with the algebraic torus recovers the open part, M0,n. We give an explicit description of this isomorphism. Unlike the log canonical embedding, this Parke-Taylor embedding respects the symmetry of the n marked points and is constructed in a single-step procedure, avoiding the intermediate embedding into a product of projective spaces.