Generalised Flatness Constants: A Framework Applied in Dimension $2$
Abstract
Let and be a bounded set. Affine transformations given by an automorphism of and a translation in are called (affine) -unimodular transformations. The image of under such a transformation is called an -unimodular copy of . It was shown in [Averkov, Hofscheier, Nill, 2019] that every convex body whose width is "big enough" contains an -unimodular copy of . The threshold when this happens is called the generalised flatness constant . It resembles the classical flatness constant if and is a lattice point. In this work, we introduce a general framework for the explicit computation of these numerical constants. The approach relies on the study of --free convex bodies generalising lattice-free (also known as hollow) convex bodies. We then focus on the case that is a full-dimensional polytope and show that inclusion-maximal --free convex bodies are polytopes. The study of those inclusion-maximal polytopes provides us with the means to explicitly determine generalised flatness constants. We apply our approach to the case the standard simplex in of normalised volume and compute and .
Keywords
Cite
@article{arxiv.2110.02770,
title = {Generalised Flatness Constants: A Framework Applied in Dimension $2$},
author = {Giulia Codenotti and Thomas Hall and Johannes Hofscheier},
journal= {arXiv preprint arXiv:2110.02770},
year = {2021}
}