A Zeroth-Order Variance-Reduced Method for Decentralized Stochastic Non-convex Optimization
Abstract
In this paper, we consider a distributed stochastic non-convex optimization problem, which is about minimizing a sum of n local cost functions over a network with only zeroth-order information. A novel single-loop Decentralized Zeroth-Order Variance Reduction algorithm, called DZOVR, is proposed, which combines two-point gradient estimation, momentum-based variance reduction technique, and gradient tracking. Under mild assumptions, we show that the algorithm is able to achieve O(dn-1ε-3) sampling complexity at each node to reach an ε-accurate stationary point and also exhibits network-independent and linear speedup properties. To the best of our knowledge, this is the first stochastic decentralized zeroth-order algorithm that achieves this sampling complexity. Numerical experiments demonstrate that DZOVR outperforms the other state-of-the-art algorithms and has network-independent and linear speedup properties.
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