Solitons of the midpoint mapping and affine curvature

Abstract

For a polygon x=(xj)j∈ Z in Rn we consider the midpoints polygon (M(x))j=(xj+xj+1)/2\,. We call a polygon a soliton of the midpoints mapping M if its midpoints polygon is the image of the polygon under an invertible affine map. We show that a large class of these polygons lie on an orbit of a one-parameter subgroup of the affine group acting on Rn. These smooth curves are also characterized as solutions of the differential equation c(t)=Bc (t)+d for a matrix B and a vector d. For n=2 these curves are curves of constant generalized-affine curvature kga=kga(B) depending on B parametrized by generalized-affine arc length unless they are parametrizations of a parabola, an ellipse, or a hyperbola.