Integral equations and model reduction for fast computation of nonlinear periodic response

Journal article (2021)

Authors

Gergely Buza ETH Zürich
George Haller ETH Zürich
S. Jain ETH Zürich
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Integral equations Model order reduction Nonlinear oscillations Periodic response Structural dynamics
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Published Date

2021

Language

English

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Abstract

We propose a reformulation for a recent integral equations approach to steady-state response computation for periodically forced nonlinear mechanical systems. This reformulation results in additional speed-up and better convergence. We show that the solutions of the reformulated equations are in one-to-one correspondence with those of the original integral equations and derive conditions under which a collocation-type approximation converges to the exact solution in the reformulated setting. Furthermore, we observe that model reduction using a selected set of vibration modes of the linearized system substantially enhances the computational performance. Finally, we discuss an open-source implementation of this approach and demonstrate the gains in computational performance using three examples that also include nonlinear finite-element models.