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Worst-Case Convergence Analysis of Inexact Gradient and Newton Methods Through Semidefinite Programming Performance Estimation

Etienne de Klerk, François Glineur, Adrien Taylor

2020SIAM Journal on Optimization32 citationsDOIOpen Access PDF

Abstract

We provide new tools for worst-case performance analysis of the gradient (or steepest descent) method of Cauchy for smooth strongly convex functions, and Newton's method for self-concordant functions, including the case of inexact search directions. The analysis uses semidefinite programming performance estimation, as pioneered by Drori and Teboulle [it Math. Program., 145 (2014), pp. 451--482], and extends recent performance estimation results for the method of Cauchy by the authors [it Optim. Lett., 11 (2017), pp. 1185--1199]. To illustrate the applicability of the tools, we demonstrate a novel complexity analysis of short step interior point methods using inexact search directions. As an example in this framework, we sketch how to give a rigorous worst-case complexity analysis of a recent interior point method by Abernethy and Hazan [it PMLR, 48 (2016), pp. 2520--2528].

Topics & Concepts

Semidefinite programmingConvergence (economics)Newton's methodMathematical optimizationEstimationMathematicsApplied mathematicsSemidefinite embeddingComputer scienceQuadratically constrained quadratic programEngineeringNonlinear systemQuadratic programmingEconomicsEconomic growthSystems engineeringPhysicsQuantum mechanicsSparse and Compressive Sensing TechniquesAdvanced Optimization Algorithms ResearchStochastic Gradient Optimization Techniques