Exploring and Learning in Sparse Linear MDPs without Computationally Intractable Oracles
September 18, 2023 ยท Declared Dead ยท ๐ Symposium on the Theory of Computing
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Authors
Noah Golowich, Ankur Moitra, Dhruv Rohatgi
arXiv ID
2309.09457
Category
cs.LG: Machine Learning
Cross-listed
cs.AI,
cs.DS,
math.OC,
stat.ML
Citations
6
Venue
Symposium on the Theory of Computing
Last Checked
4 months ago
Abstract
The key assumption underlying linear Markov Decision Processes (MDPs) is that the learner has access to a known feature map $ฯ(x, a)$ that maps state-action pairs to $d$-dimensional vectors, and that the rewards and transitions are linear functions in this representation. But where do these features come from? In the absence of expert domain knowledge, a tempting strategy is to use the ``kitchen sink" approach and hope that the true features are included in a much larger set of potential features. In this paper we revisit linear MDPs from the perspective of feature selection. In a $k$-sparse linear MDP, there is an unknown subset $S \subset [d]$ of size $k$ containing all the relevant features, and the goal is to learn a near-optimal policy in only poly$(k,\log d)$ interactions with the environment. Our main result is the first polynomial-time algorithm for this problem. In contrast, earlier works either made prohibitively strong assumptions that obviated the need for exploration, or required solving computationally intractable optimization problems. Along the way we introduce the notion of an emulator: a succinct approximate representation of the transitions that suffices for computing certain Bellman backups. Since linear MDPs are a non-parametric model, it is not even obvious whether polynomial-sized emulators exist. We show that they do exist and can be computed efficiently via convex programming. As a corollary of our main result, we give an algorithm for learning a near-optimal policy in block MDPs whose decoding function is a low-depth decision tree; the algorithm runs in quasi-polynomial time and takes a polynomial number of samples. This can be seen as a reinforcement learning analogue of classic results in computational learning theory. Furthermore, it gives a natural model where improving the sample complexity via representation learning is computationally feasible.
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