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A Systematic Approach to Lyapunov Analyses of Continuous-Time Models in Convex Optimization

Céline Moucer, Adrien Taylor, Francis Bach

2023SIAM Journal on Optimization14 citationsDOIOpen Access PDF

Abstract

First-order methods are often analyzed via their continuous-time models, where their worst-case convergence properties are usually approached via Lyapunov functions. In this work, we provide a systematic and principled approach to find and verify Lyapunov functions for classes of ordinary and stochastic differential equations. More precisely, we extend the performance estimation framework, originally proposed by Drori and Teboulle [10], to continuous-time models. We retrieve convergence results comparable to those of discrete methods using fewer assumptions and convexity inequalities, and provide new results for stochastic accelerated gradient flows.

Topics & Concepts

Lyapunov functionMathematicsConvergence (economics)Convex optimizationOrdinary differential equationMathematical optimizationApplied mathematicsRegular polygonDiscrete time and continuous timeConvex functionDifferential equationMathematical analysisNonlinear systemEconomic growthQuantum mechanicsPhysicsEconomicsStatisticsGeometryStochastic Gradient Optimization TechniquesMarkov Chains and Monte Carlo MethodsSparse and Compressive Sensing Techniques
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