AI Chat AI Image Generator AI Video Text to Speech

Breakdown points of Fermat-Weber problems under gauge distances

06/23/2023

∙

by Andrei Comăneci, et al.

∙

∙

We compute the robustness of Fermat–Weber points with respect to any finite gauge. We show a breakdown point of 1/(1+σ) where σ is the asymmetry measure of the gauge. We obtain quantitative results indicating how far a corrupted Fermat–Weber point can lie from the true value in terms of the original sample and the size of the corrupted part. If the distance from the true value depends only on the original sample, then we call the gauge 'uniformly robust'. We show that polyhedral gauges are uniformly robust, but locally strictly convex norms are not.

Andrei Comăneci
1 publication
Frank Plastria
1 publication

page 1

page 2

page 3

page 4

research

∙ 03/02/2020

Holes and islands in random point sets

For d ∈ℕ, let S be a finite set of points in ℝ^d in general position. A ...

0 Martin Balko, et al. ∙

research

∙ 03/05/2022

On the Error of Random Sampling: Uniformly Distributed Random Points on Parametric Curves

Given a parametric polynomial curve γ:[a,b]→ℝ^n, how can we sample a ran...

0 Apostolos Chalkis, et al. ∙

research

∙ 11/27/2019

Expected dispersion of uniformly distributed points

The dispersion of a point set in [0,1]^d is the volume of the largest ax...

0 Aicke Hinrichs, et al. ∙

research

∙ 12/08/2017

How to Net a Convex Shape

We revisit the problem of building weak -nets for convex ranges over...

0 Sariel Har-Peled, et al. ∙

research

∙ 06/16/2021

Binary classification with corrupted labels

In a binary classification problem where the goal is to fit an accurate ...

0 Yonghoon Lee, et al. ∙

research

∙ 05/21/2018

Restricted eigenvalue property for corrupted Gaussian designs

Motivated by the construction of robust estimators using the convex rela...

0 Philip Thompson, et al. ∙