Sample Complexity and Overparameterization Bounds for Projection-Free Neural TD Learning
Cayci, Semih, Satpathi, Siddhartha, He, Niao, Srikant, R.
–arXiv.org Artificial Intelligence
We study the dynamics of temporal-difference learning with neural network-based value function approximation over a general state space, namely, \emph{Neural TD learning}. Existing analysis of neural TD learning relies on either infinite width-analysis or constraining the network parameters in a (random) compact set; as a result, an extra projection step is required at each iteration. This paper establishes a new convergence analysis of neural TD learning \emph{without any projection}. We show that the projection-free TD learning equipped with a two-layer ReLU network of any width exceeding $poly(\overline{\nu},1/\epsilon)$ converges to the true value function with error $\epsilon$ given $poly(\overline{\nu},1/\epsilon)$ iterations or samples, where $\overline{\nu}$ is an upper bound on the RKHS norm of the value function induced by the neural tangent kernel. Our sample complexity and overparameterization bounds are based on a drift analysis of the network parameters as a stopped random process in the lazy training regime.
arXiv.org Artificial Intelligence
Mar-1-2021
- Country:
- North America > United States
- Illinois (0.05)
- Massachusetts > Middlesex County
- Belmont (0.04)
- Europe
- United Kingdom > England
- Cambridgeshire > Cambridge (0.04)
- Switzerland > Zürich
- Zürich (0.04)
- United Kingdom > England
- North America > United States
- Genre:
- Research Report (0.50)
- Industry:
- Leisure & Entertainment > Games (0.46)
- Technology: