Total Variation Isoperimetric Profiles

Author(s)

DeFord, Daryl; Lavenant, Hugo; Schutzman, Zachary; Solomon, Justin

Abstract

© 2019 Society for Industrial and Applied Mathematics Publications. All rights reserved. Applications such as political redistricting demand quantitative measures of geometric compactness to distinguish between simple and contorted shapes. While the isoperimetric quotient, or ratio of area to perimeter squared, is commonly used in practice, it is sensitive to noisy data and irrelevant geographic features like coastline. These issues are addressed in theory by the isoperimetric profile, which plots the minimum perimeter needed to inscribe regions of different prescribed areas within the boundary of a shape. Efficient algorithms for computing this profile, however, are not known in practice. Hence, in this paper, we propose a convex Eulerian relaxation of the isoperimetric profile using total variation. We prove theoretical properties of our relaxation, showing that it still satisfies an isoperimetric inequality and yields a convex function of the prescribed area. Furthermore, we provide a discretization of the problem, an optimization technique, and experiments demonstrating the value of our relaxation.

Date issued

2019

URI

https://hdl.handle.net/1721.1/135915

Department

Massachusetts Institute of Technology. Computer Science and Artificial Intelligence Laboratory

Journal

SIAM Journal on Applied Algebra and Geometry

Publisher

Society for Industrial & Applied Mathematics (SIAM)