English

Linear Complexity Gibbs Sampling for Generalized Labeled Multi-Bernoulli Filtering

Machine Learning 2023-12-29 v2 Signal Processing Computation

Abstract

Generalized Labeled Multi-Bernoulli (GLMB) densities arise in a host of multi-object system applications analogous to Gaussians in single-object filtering. However, computing the GLMB filtering density requires solving NP-hard problems. To alleviate this computational bottleneck, we develop a linear complexity Gibbs sampling framework for GLMB density computation. Specifically, we propose a tempered Gibbs sampler that exploits the structure of the GLMB filtering density to achieve an O(T(P+M))\mathcal{O}(T(P+M)) complexity, where TT is the number of iterations of the algorithm, PP and MM are the number hypothesized objects and measurements. This innovation enables the GLMB filter implementation to be reduced from an O(TP2M)\mathcal{O}(TP^{2}M) complexity to O(T(P+M+logT)+PM)\mathcal{O}(T(P+M+\log T)+PM). Moreover, the proposed framework provides the flexibility for trade-offs between tracking performance and computational load. Convergence of the proposed Gibbs sampler is established, and numerical studies are presented to validate the proposed GLMB filter implementation.

Keywords

Cite

@article{arxiv.2211.16041,
  title  = {Linear Complexity Gibbs Sampling for Generalized Labeled Multi-Bernoulli Filtering},
  author = {Changbeom Shim and Ba-Tuong Vo and Ba-Ngu Vo and Jonah Ong and Diluka Moratuwage},
  journal= {arXiv preprint arXiv:2211.16041},
  year   = {2023}
}
R2 v1 2026-06-28T07:16:27.701Z