Characterizing Marginalization and Incremental Operations on the Bayes Tree

Author(s)

Fourie, Dehann; Espinoza, Antonio Terán; Kaess, Michael; Leonard, John

Abstract

Perception systems for autonomy are most useful if they can operate within limited/predictable computing resources. Existing algorithms in robot navigation—e.g. simultaneous localization and mapping—employ concepts from filtering, fixed-lag, or incremental smoothing to find feasible inference solutions. Using factor graphs as a probabilistic modeling language, we emphasize the importance of marginalization operations on the equivalent Bayes (junction) tree. The objective is to elucidate the connection between simple tree-based message passing rules with the aforementioned state estimation approaches, and their frequently overlooked relation to direct marginalization on the Bayes tree. We characterize the inherent marginalization operation as part of the fundamental Chapman-Kolmogorov transit integrals which unifies many state-of-the-art approaches. The belief propagation model is then used to define five major tree inference strategies, with regard to computation recycling and resource constrained operation. A series of illustrative examples and results show the versatility of the method.

Description

Algorithmic Foundations of Robotics XIV. WAFR 2020

Date issued

2021

URI

https://hdl.handle.net/1721.1/153760

Department

Massachusetts Institute of Technology. Department of Mechanical Engineering
Massachusetts Institute of Technology. Department of Mechanical Engineering

Publisher

Springer International Publishing

Citation

Fourie, Dehann, Espinoza, Antonio Terán, Kaess, Michael and Leonard, John. 2021. "Characterizing Marginalization and Incremental Operations on the Bayes Tree."

Version: Author's final manuscript