On generalizations of the pentagram map: discretizations of AGD flows

Abstract

In this paper we investigate discretizations of AGD flows whose projective realizations are defined by intersecting different types of subspaces in m. These maps are natural candidates to generalize the pentagram map, itself defined as the intersection of consecutive shortest diagonals of a convex polygon, and a completely integrable discretization of the Boussinesq equation. We conjecture that the k-AGD flow in m dimensions can be discretized using one k-1 subspace and k-1 different m-1-dimensional subspaces of m.