Rao-Blackwellized POMDP Planning
This work addresses efficiency issues in decision-making under uncertainty for robotics or AI systems, representing an incremental improvement over existing particle filter methods.
The study tackled the challenges of particle deprivation and high computational costs in POMDP planning by introducing Rao-Blackwellized POMDP solvers, showing that RBPFs maintain accurate belief approximations with fewer particles and improve planning quality significantly compared to SIRPF-based methods under the same computational limits.
Partially Observable Markov Decision Processes (POMDPs) provide a structured framework for decision-making under uncertainty, but their application requires efficient belief updates. Sequential Importance Resampling Particle Filters (SIRPF), also known as Bootstrap Particle Filters, are commonly used as belief updaters in large approximate POMDP solvers, but they face challenges such as particle deprivation and high computational costs as the system's state dimension grows. To address these issues, this study introduces Rao-Blackwellized POMDP (RB-POMDP) approximate solvers and outlines generic methods to apply Rao-Blackwellization in both belief updates and online planning. We compare the performance of SIRPF and Rao-Blackwellized Particle Filters (RBPF) in a simulated localization problem where an agent navigates toward a target in a GPS-denied environment using POMCPOW and RB-POMCPOW planners. Our results not only confirm that RBPFs maintain accurate belief approximations over time with fewer particles, but, more surprisingly, RBPFs combined with quadrature-based integration improve planning quality significantly compared to SIRPF-based planning under the same computational limits.