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arxiv: 2209.06910 · v1 · pith:JMPNXSK3new · submitted 2022-09-07 · 🧮 math.DS · cs.LG· nlin.CD

Modelling of physical systems with a Hopf bifurcation using mechanistic models and machine learning

classification 🧮 math.DS cs.LGnlin.CD
keywords modelbifurcationmechanisticphysicalstructureaeroelasticcycleexperimental
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We propose a new hybrid modelling approach that combines a mechanistic model with a machine-learnt model to predict the limit cycle oscillations of physical systems with a Hopf bifurcation. The mechanistic model is an ordinary differential equation normal-form model capturing the bifurcation structure of the system. A data-driven mapping from this model to the experimental observations is then identified based on experimental data using machine learning techniques. The proposed method is first demonstrated numerically on a Van der Pol oscillator and a three-degree-of-freedom aeroelastic model. It is then applied to model the behaviour of a physical aeroelastic structure exhibiting limit cycle oscillations during wind tunnel tests. The method is shown to be general, data-efficient and to offer good accuracy without any prior knowledge about the system other than its bifurcation structure.

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