Analysis of Optimization Algorithms via Sum-of-Squares
This work provides a new theoretical framework for certifying convergence rates in optimization, which is incremental but could impact machine learning and large-scale data analysis by enabling improved analysis of algorithms.
The authors tackled the problem of analyzing first-order optimization algorithms for convex minimization by introducing a sum-of-squares framework that unifies and systematizes performance analysis, showing that it generalizes the Performance Estimation Problem and deriving new convergence bounds for noisy gradient descent with inexact line search methods.
We introduce a new framework for unifying and systematizing the performance analysis of first-order black-box optimization algorithms for unconstrained convex minimization. The low-cost iteration complexity enjoyed by first-order algorithms renders them particularly relevant for applications in machine learning and large-scale data analysis. Relying on sum-of-squares (SOS) optimization, we introduce a hierarchy of semidefinite programs that give increasingly better convergence bounds for higher levels of the hierarchy. Alluding to the power of the SOS hierarchy, we show that the (dual of the) first level corresponds to the Performance Estimation Problem (PEP) introduced by Drori and Teboulle [Math. Program., 145(1):451--482, 2014], a powerful framework for determining convergence rates of first-order optimization algorithms. Consequently, many results obtained within the PEP framework can be reinterpreted as degree-1 SOS proofs, and thus, the SOS framework provides a promising new approach for certifying improved rates of convergence by means of higher-order SOS certificates. To determine analytical rate bounds, in this work we use the first level of the SOS hierarchy and derive new result{s} for noisy gradient descent with inexact line search methods (Armijo, Wolfe, and Goldstein).