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Control of Bifurcation Structures using Shape Optimization

Nicolas Boullé, Patrick E. Farrell, Alberto Paganini

2022SIAM Journal on Scientific Computing11 citationsDOIOpen Access PDF

Abstract

Many problems in engineering can be understood as controlling the bifurcation structure of a given device. For example, one may wish to delay the onset of instability or bring forward a bifurcation to enable rapid switching between states. We propose a numerical technique for controlling the bifurcation diagram of a nonlinear partial differential equation by varying the shape of the domain. Specifically, we are able to delay or advance a given branch point to a target parameter value. The algorithm consists of solving a shape optimization problem constrained by an augmented system of equations, the Moore--Spence system, that characterize the location of the branch points. Numerical experiments on the Allen--Cahn, Navier--Stokes, and hyperelasticity equations demonstrate the effectiveness of this technique in a wide range of settings.

Topics & Concepts

Bifurcation diagramMathematicsBifurcationNonlinear systemSaddle-node bifurcationBifurcation theoryApplied mathematicsPartial differential equationNumerical analysisDomain (mathematical analysis)Transcritical bifurcationInfinite-period bifurcationMathematical analysisControl theory (sociology)Computer scienceControl (management)Quantum mechanicsPhysicsArtificial intelligenceTopology Optimization in EngineeringAdvanced Mathematical Modeling in EngineeringAdvanced Numerical Methods in Computational Mathematics