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Explicit Stabilized Integrators for Stiff Optimal Control Problems

Almuslimani, Ibrahim, Vilmart, Gilles

2021Archive ouverte UNIGE (University of Geneva)15 citationsOpen Access PDF

Abstract

Explicit stabilized methods are an efficient alternative to implicit schemes for the time integration of stiff systems of differential equations in large dimension. In this paper we derive explicit stabilized integrators of orders one and two for the optimal control of stiff systems. We analyze their favourable stability and symplecticity properties based on the continuous optimality conditions. Numerical experiments including the optimal control of a nonlinear diffusion-advection PDE illustrate the efficiency of the new approach.

Topics & Concepts

MathematicsIntegratorOptimal controlRunge–Kutta methodsConvergence (economics)Dimension (graph theory)Applied mathematicsNonlinear systemStability (learning theory)Backward differentiation formulaNumerical analysisDifferential equationControl theory (sociology)Mathematical optimizationOrdinary differential equationMathematical analysisControl (management)Differential algebraic equationComputer scienceEconomic growthPhysicsBandwidth (computing)Machine learningPure mathematicsQuantum mechanicsEconomicsArtificial intelligenceComputer networkNumerical methods for differential equationsAdvanced Numerical Methods in Computational MathematicsComputational Fluid Dynamics and Aerodynamics