Notes on polytopes, amplitudes and boundary configurations for Grassmannian string integrals
Abstract
We continue the study of positive geometries underlying the {\it Grassmannian string integrals}, which are a class of "stringy canonical forms", or stringy integrals, over the positive Grassmannian mod torus action, . The leading order of any such stringy integral is given by the canonical function of a polytope, which can be obtained using the Minkowski sum of the Newton polytopes for the regulators of the integral, or equivalently given by the so-called scattering-equation map. The canonical function of the polytopes for Grassmannian string integrals, or the volume of their dual polytopes, is also known as the generalized bi-adjoint amplitudes. We compute all the linear functions for the facets which cut out the polytope for all cases up to , with up to k=4 and their parity conjugate cases. The main novelty of our computation is that we present these facets in a manifestly gauge-invariant and cyclic way, and identify the boundary configurations of corresponding to these facets, which have nice geometric interpretations in terms of points in -dimensional space. All the facets and configurations we discovered up to directly generalize to all , although new types are still needed for higher .
Cite
@article{arxiv.2001.09603,
title = {Notes on polytopes, amplitudes and boundary configurations for Grassmannian string integrals},
author = {Song He and Lecheng Ren and Yong Zhang},
journal= {arXiv preprint arXiv:2001.09603},
year = {2021}
}
Comments
34 pages+ appendices, lots of figures, with typo fixed. Ancilliary files for all the facets up to $k=3$, $n=10$ and $k=4$, $n=9$, as well as ampltitudes up to $n=8$ are included with the submission