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Stochastic Nonlinear Control via Finite-dimensional Spectral Dynamic Embedding

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arxiv 2304.03907 v6 pith:LL5VAXA2 submitted 2023-04-08 cs.LG math.OC

Stochastic Nonlinear Control via Finite-dimensional Spectral Dynamic Embedding

classification cs.LG math.OC
keywords approximationcontrolstochasticnonlinearrepresentationcharacterizedynamicsembedding
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This paper proposes an approach, Spectral Dynamics Embedding Control (SDEC), to optimal control for nonlinear stochastic systems. This method reveals an infinite-dimensional feature representation induced by the system's nonlinear stochastic dynamics, enabling a linear representation of the state-action value function. For practical implementation, this representation is approximated using finite-dimensional truncations, specifically via two prominent kernel approximation methods: random feature truncation and Nystrom approximation. To characterize the effectiveness of these approximations, we provide an in-depth theoretical analysis to characterize the approximation error arising from the finite-dimension truncation and statistical error due to finite-sample approximation in both policy evaluation and policy optimization. Empirically, our algorithm performs favorably against existing stochastic control algorithms on several benchmark problems.

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