Risk-sensitive control as inference with R\'enyi divergence
This paper introduces the risk-sensitive control as inference (RCaI) that extends CaI by using R\'{e}nyi divergence variational inference. RCaI is shown to be equivalent to log-probability regularized risk-sensitive control, which is an extension of the maximum entropy (MaxEnt) control. We also prove that the risk-sensitive optimal policy can be obtained by solving a soft Bellman equation, which reveals several equivalences between RCaI, MaxEnt control, the optimal posterior for CaI, and linearly-solvable control. Moreover, based on RCaI, we derive the risk-sensitive reinforcement learning (RL) methods: the policy gradient and the soft actor-critic. As the risk-sensitivity parameter vanishes, we recover the risk-neutral CaI and RL, which means that RCaI is a unifying framework. Furthermore, we give another risk-sensitive generalization of the MaxEnt control using R\'{e}nyi entropy regularization. We show that in both of our extensions, the optimal policies have the same structure even though the derivations are very different.
Nov-4-2024
- Country:
- North America > United States
- New York (0.04)
- Europe > Germany
- Asia > Japan
- Honshū
- Kantō > Tokyo Metropolis Prefecture
- Tokyo (0.04)
- Kansai > Kyoto Prefecture
- Kyoto (0.04)
- Kantō > Tokyo Metropolis Prefecture
- Honshū
- North America > United States
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- Research Report (1.00)
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