Online Linear Quadratic Control
Cohen, Alon, Hassidim, Avinatan, Koren, Tomer, Lazic, Nevena, Mansour, Yishay, Talwar, Kunal
We study the problem of controlling linear time-invariant systems with known noisy dynamics and adversarially chosen quadratic losses. We present the first efficient online learning algorithms in this setting that guarantee $O(\sqrt{T})$ regret under mild assumptions, where $T$ is the time horizon. Our algorithms rely on a novel SDP relaxation for the steady-state distribution of the system. Crucially, and in contrast to previously proposed relaxations, the feasible solutions of our SDP all correspond to "strongly stable" policies that mix exponentially fast to a steady state.
Jun-19-2018
- Country:
- North America > United States
- New Jersey (0.04)
- Massachusetts > Middlesex County
- Belmont (0.04)
- Europe > United Kingdom
- England > Cambridgeshire > Cambridge (0.04)
- Asia > Middle East
- Israel > Tel Aviv District > Tel Aviv (0.04)
- North America > United States
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- Research Report (0.64)
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- Education (0.34)
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