Poisson Multi-Bernoulli Mapping Using Gibbs Sampling
Abstract
This paper addresses the mapping problem. Using a conjugate prior form, we derive the exact theoretical batch multi-object posterior density of the map given a set of measurements. The landmarks in the map are modeled as extended objects, and the measurements are described as a Poisson process, conditioned on the map. We use a Poisson process prior on the map and prove that the posterior distribution is a hybrid Poisson, multi-Bernoulli mixture distribution. We devise a Gibbs sampling algorithm to sample from the batch multi-object posterior. The proposed method can handle uncertainties in the data associations and the cardinality of the set of landmarks, and is parallelizable, making it suitable for large-scale problems. The performance of the proposed method is evaluated on synthetic data and is shown to outperform a state-of-the-art method.
Cite
@article{arxiv.1811.03154,
title = {Poisson Multi-Bernoulli Mapping Using Gibbs Sampling},
author = {Maryam Fatemi and Karl Granström and Lennart Svensson and Francisco J. R. Ruiz and Lars Hammarstrand},
journal= {arXiv preprint arXiv:1811.03154},
year = {2018}
}
Comments
14 pages, 6 figures