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How to compute invariant manifolds and their reduced dynamics in high-dimensional finite element models

Shobhit Jain, George Haller

2021Nonlinear Dynamics122 citationsDOIOpen Access PDF

Abstract

Abstract Invariant manifolds are important constructs for the quantitative and qualitative understanding of nonlinear phenomena in dynamical systems. In nonlinear damped mechanical systems, for instance, spectral submanifolds have emerged as useful tools for the computation of forced response curves, backbone curves, detached resonance curves ( isolas ) via exact reduced-order models. For conservative nonlinear mechanical systems, Lyapunov subcenter manifolds and their reduced dynamics provide a way to identify nonlinear amplitude–frequency relationships in the form of conservative backbone curves. Despite these powerful predictions offered by invariant manifolds, their use has largely been limited to low-dimensional academic examples. This is because several challenges render their computation unfeasible for realistic engineering structures described by finite element models. In this work, we address these computational challenges and develop methods for computing invariant manifolds and their reduced dynamics in very high-dimensional nonlinear systems arising from spatial discretization of the governing partial differential equations. We illustrate our computational algorithms on finite element models of mechanical structures that range from a simple beam containing tens of degrees of freedom to an aircraft wing containing more than a hundred–thousand degrees of freedom.

Topics & Concepts

DiscretizationNonlinear systemInvariant (physics)Finite element methodComputationMathematicsDegrees of freedom (physics and chemistry)Lyapunov functionDifferential geometryPartial differential equationDynamical systems theorySpectral element methodMathematical analysisApplied mathematicsComputational fluid dynamicsLocal coordinatesComputer scienceClassical mechanicsBeam (structure)Mechanical systemComplex geometryBladed Disk Vibration DynamicsModel Reduction and Neural NetworksChaos control and synchronization
How to compute invariant manifolds and their reduced dynamics in high-dimensional finite element models | Litcius