Combinatorics of m=1 Grasstopes

Abstract

A Grasstope is the image of the totally nonnegative Grassmannian Gr≥ 0(k,n) under a linear map Gr(k,n) Gr(k,k+m). This is a generalization of the amplituhedron, a geometric object of great importance to calculating scattering amplitudes in physics. The amplituhedron is a Grasstope arising from a totally positive linear map. While amplituhedra are relatively well-studied, much less is known about general Grasstopes. We study Grasstopes in the m=1 case and show that they can be characterized as unions of cells of a hyperplane arrangement satisfying a certain sign variation condition, extending work of Karp and Williams. Inspired by this characterization, we also suggest a notion of a Grasstope arising from an arbitrary oriented matroid.