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De-singularity Subgradient for the $q$-th-Powered $\ell_p$-Norm Weber Location Problem

Optimization and Control 2025-02-04 v2 Machine Learning

Abstract

The Weber location problem is widely used in several artificial intelligence scenarios. However, the gradient of the objective does not exist at a considerable set of singular points. Recently, a de-singularity subgradient method has been proposed to fix this problem, but it can only handle the qq-th-powered 2\ell_2-norm case (1q<21\leqslant q<2), which has only finite singular points. In this paper, we further establish the de-singularity subgradient for the qq-th-powered p\ell_p-norm case with 1qp1\leqslant q\leqslant p and 1p<21\leqslant p<2, which includes all the rest unsolved situations in this problem. This is a challenging task because the singular set is a continuum. The geometry of the objective function is also complicated so that the characterizations of the subgradients, minimum and descent direction are very difficult. We develop a qq-th-powered p\ell_p-norm Weiszfeld Algorithm without Singularity (qqPppNWAWS) for this problem, which ensures convergence and the descent property of the objective function. Extensive experiments on six real-world data sets demonstrate that qqPppNWAWS successfully solves the singularity problem and achieves a linear computational convergence rate in practical scenarios.

Cite

@article{arxiv.2412.15546,
  title  = {De-singularity Subgradient for the $q$-th-Powered $\ell_p$-Norm Weber Location Problem},
  author = {Zhao-Rong Lai and Xiaotian Wu and Liangda Fang and Ziliang Chen and Cheng Li},
  journal= {arXiv preprint arXiv:2412.15546},
  year   = {2025}
}

Comments

AAAI 2025

R2 v1 2026-06-28T20:43:19.850Z