A semidefinite programming approach for robust elliptic localization
Abstract
This short communication addresses the problem of elliptic localization with outlier measurements. Outliers are prevalent in various location-enabled applications, and can significantly compromise the positioning performance if not adequately handled. Instead of following the common trend of using -estimation or adjusting the conventional least squares formulation by integrating extra error variables, we take a different path. Specifically, we explore the worst-case robust approximation criterion to bolster resistance of the elliptic location estimator against outliers. From a geometric standpoint, our method boils down to pinpointing the Chebyshev center of a feasible set, which is defined by the available bistatic ranges with bounded measurement errors. For a practical approach to the associated min-max problem, we convert it into the convex optimization framework of semidefinite programming (SDP). Numerical simulations confirm that our SDP-based technique can outperform a number of existing elliptic localization schemes in terms of positioning accuracy in Gaussian mixture noise.
Cite
@article{arxiv.2401.15619,
title = {A semidefinite programming approach for robust elliptic localization},
author = {Wenxin Xiong and Yuming Chen and Jiajun He and Zhang-Lei Shi and Keyuan Hu and Hing Cheung So and Chi-Sing Leung},
journal= {arXiv preprint arXiv:2401.15619},
year = {2024}
}