A Monte-Carlo AIXI Approximation

Joel Veness, Kee Siong Ng, Marcus Hutter, William T. B. Uther, David Silver

JAIR 2011 pp. 95-142

doi:10.1613/JAIR.3125 /jair/2011/veness2011jair-montecarlo/

Abstract

This paper introduces a principled approach for the design of a scalable general reinforcement learning agent. Our approach is based on a direct approximation of AIXI, a Bayesian optimality notion for general reinforcement learning agents. Previously, it has been unclear whether the theory of AIXI could motivate the design of practical algorithms. We answer this hitherto open question in the affirmative, by providing the first computationally feasible approximation to the AIXI agent. To develop our approximation, we introduce a new Monte-Carlo Tree Search algorithm along with an agent-specific extension to the Context Tree Weighting algorithm. Empirically, we present a set of encouraging results on a variety of stochastic and partially observable domains. We conclude by proposing a number of directions for future research.

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Text

Veness et al. "A Monte-Carlo AIXI Approximation." Journal of Artificial Intelligence Research, 2011. doi:10.1613/JAIR.3125

Markdown

[Veness et al. "A Monte-Carlo AIXI Approximation." Journal of Artificial Intelligence Research, 2011.](https://mlanthology.org/jair/2011/veness2011jair-montecarlo/) doi:10.1613/JAIR.3125

BibTeX

@article{veness2011jair-montecarlo,
  title     = {{A Monte-Carlo AIXI Approximation}},
  author    = {Veness, Joel and Ng, Kee Siong and Hutter, Marcus and Uther, William T. B. and Silver, David},
  journal   = {Journal of Artificial Intelligence Research},
  year      = {2011},
  pages     = {95-142},
  doi       = {10.1613/JAIR.3125},
  volume    = {40},
  url       = {https://mlanthology.org/jair/2011/veness2011jair-montecarlo/}
}