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Nonlinear Dynamic and Kinematic Model of a Spar-Buoy: Parametric Resonance and Yaw Numerical Instability |
- Metaadatok
| Tartalom: | http://hdl.handle.net/10890/15679 |
|---|---|
| Archívum: | Műegyetem Digitális Archívum |
| Gyűjtemény: |
1. Tudományos közlemények, publikációk
Műszaki tudományok Gépészeti tudományok |
| Cím: |
Nonlinear Dynamic and Kinematic Model of a Spar-Buoy: Parametric Resonance and Yaw Numerical Instability
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| Létrehozó: |
Giorgi, Giuseppe
Davidson, Josh
Habib, Giuseppe
Bracco, Giovanni
Mattiazzo, Giuliana
Kalmár-Nagy, Tamás
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| Dátum: |
2021-08-09T08:02:00Z
2021-08-09T08:02:00Z
2020-07-09
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| Tartalmi leírás: |
Mathematical models are essential for the design and control of offshore systems,
to simulate the fluid–structure interactions and predict the motions and the structural loads.
In the development and derivation of the models, simplifying assumptions are normally required,
usually implying linear kinematics and hydrodynamics. However, while the assumption of
linear, small amplitude motion fits traditional offshore problems, in normal operational conditions
(it is desirable to stabilize ships, boats, and offshore platforms), large motion and potential
dynamic instability may arise (e.g., harsh sea conditions). Furthermore, such nonlinearities are
particularly evident in wave energy converters, as large motions are expected (and desired) to
enhance power extraction. The inadequacy of linear models has led to an increasing number of
publications and codes implementing nonlinear hydrodynamics. However, nonlinear kinematics has
received very little attention, as few models yet consider six degrees of freedom and large rotations.
This paper implements a nonlinear hydrodynamic and kinematic model for an archetypal floating
structure, commonplace in offshore applications: an axisymmetric spar-buoy. The influence of
nonlinear dynamics and kinematics causing coupling between modes of motion are demonstrated.
The nonlinear dynamics are shown to cause parametric resonance in the roll and pitch degrees of
freedom, while the nonlinear kinematics are shown to potentially cause numerical instability in the
yaw degree of freedom. A case study example is presented to highlight the nonlinear dynamic and
kinematic effects, and the importance of including a nominal restoring term in the yaw DoF presented.
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| Nyelv: |
angol
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| Típus: |
Folyóiratcikk
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| Formátum: |
application/pdf
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| Azonosító: |