This work addresses motion planning under uncertainty as a stochastic optimal control problem. The path distribution induced by the optimal controller corresponds to a posterior path distribution with a known form. To approximate this posterior, we frame an optimization problem in the space of Gaussian distributions, which aligns with the Gaussian Variational Inference Motion Planning (GVIMP) paradigm introduced in \cite{yu2023gaussian}. In this framework, the computation bottleneck lies in evaluating the expectation of collision costs over a dense discretized trajectory and computing the marginal covariances. This work exploits the sparse motion planning factor graph, which allows for parallel computing collision costs and Gaussian Belief Propagation (GBP) marginal covariance computation, to introduce a computationally efficient approach to solving GVIMP. We term the novel paradigm as the Parallel Gaussian Variational Inference Motion Planning (P-GVIMP). We validate the proposed framework on various robotic systems, demonstrating significant speed acceleration achieved by leveraging Graphics Processing Units (GPUs) for parallel computation. An open-sourced implementation is presented at https://github.com/hzyu17/VIMP.

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