Temporal Variabilities Limit Convergence Rates in Gradient-Based Online Optimization

Abstract

This paper investigates the fundamental performance limits of gradient-based algorithms for time-varying optimization. Leveraging the internal model principle and root locus techniques, we show that temporal variabilities impose intrinsic limits on the achievable rate of convergence. For a problem with condition ratio and time variation whose model has degree n, we show that the worst-case convergence rate of any minimal-order gradient-based algorithm is TV = (-1+1)1/n. This bound reveals a fundamental tradeoff between problem conditioning, temporal complexity, and rate of convergence. We further construct explicit controllers that attain the bound for low-degree models of time variation.

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