Walking the Values in Bayesian Inverse Reinforcement Learning
This work addresses a computational bottleneck for researchers and practitioners in reinforcement learning, though it is incremental as it builds on existing Bayesian IRL methods.
The paper tackles the computational inefficiency in Bayesian inverse reinforcement learning (IRL) by shifting the sampling focus from reward functions to Q-values, which reduces the cost of forward planning. The proposed ValueWalk method demonstrates improved efficiency on several tasks.
The goal of Bayesian inverse reinforcement learning (IRL) is recovering a posterior distribution over reward functions using a set of demonstrations from an expert optimizing for a reward unknown to the learner. The resulting posterior over rewards can then be used to synthesize an apprentice policy that performs well on the same or a similar task. A key challenge in Bayesian IRL is bridging the computational gap between the hypothesis space of possible rewards and the likelihood, often defined in terms of Q values: vanilla Bayesian IRL needs to solve the costly forward planning problem - going from rewards to the Q values - at every step of the algorithm, which may need to be done thousands of times. We propose to solve this by a simple change: instead of focusing on primarily sampling in the space of rewards, we can focus on primarily working in the space of Q-values, since the computation required to go from Q-values to reward is radically cheaper. Furthermore, this reversion of the computation makes it easy to compute the gradient allowing efficient sampling using Hamiltonian Monte Carlo. We propose ValueWalk - a new Markov chain Monte Carlo method based on this insight - and illustrate its advantages on several tasks.