Distributed Stochastic Constrained Composite Optimization Over Time-Varying Network With a Class of Communication Noise

This article is concerned with the distributed stochastic multiagent-constrained optimization problem over a time-varying network with a class of communication noise. This article considers the problem in composite optimization setting, which is more general in the literature of noisy network optimization. It is noteworthy that the mainstream existing methods for noisy network optimization are Euclidean projection based. Based on the Bregman projection-based mirror descent scheme, we present a non-Euclidean method and investigate their convergence behavior. This method is the distributed stochastic composite mirror descent type method (DSCMD-N), which provides a more general algorithm framework. Some new error bounds for DSCMD-N are obtained. To the best of our knowledge, this is the first work to analyze and derive convergence rates of optimization algorithm in noisy network optimization. We also show that an optimal rate of O(1/root T) in nonsmooth convex optimization can be obtained for the proposed method under appropriate communication noise condition. Moveover, novel convergence results are comprehensively derived in expectation convergence, high probability convergence, and almost surely sense.

Automated summary

This article discusses the distributed stochastic multiagent-constrained optimization problem over a time-varying network with a specific class of communication noise. A non-Euclidean method, based on the Bregman projection-based mirror descent scheme, is proposed and its convergence behavior is investigated. The method, known as the distributed stochastic composite mirror descent type method (DSCMD-N), provides a more general algorithm framework and new error bounds.