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Analysis of Theoretical and Numerical Properties of Sequential Convex Programming for Continuous-Time Optimal Control

Riccardo Bonalli, Thomas Lew, Marco Pavone

2022IEEE Transactions on Automatic Control30 citationsDOIOpen Access PDF

Abstract

Sequential convex programming (SCP) has recently gained significant popularity as an effective method for solving optimal control problems and has been successfully applied in several different domains. However, the theoretical analysis of SCP has received comparatively limited attention, and it is often restricted to discrete-time formulations. In this article, we present a unifying theoretical analysis of a fairly general class of SCP procedures for continuous-time optimal control problems. In addition to the derivation of convergence guarantees in a continuous-time setting, our analysis reveals two new numerical and practical insights. First, we show how one can more easily account for manifold-type constraints, which are a defining feature of optimal control of mechanical systems. Second, we show how our theoretical analysis can be leveraged to accelerate SCP-based optimal control methods by infusing techniques from indirect optimal control.

Topics & Concepts

Optimal controlMathematical optimizationConvergence (economics)Computer scienceConvex optimizationDynamic programmingConvex analysisRegular polygonDiscrete time and continuous timeControl (management)MathematicsArtificial intelligenceEconomicsGeometryStatisticsEconomic growthOptimization and Variational AnalysisRobotic Path Planning AlgorithmsReinforcement Learning in Robotics
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