2021
DOI: 10.1016/j.jfluidstructs.2021.103266
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A generalized eigenvalue solution to the flutter stability problem with true damping: The p-L method

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Cited by 8 publications
(3 citation statements)
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“…This requires the partial derivatives of the aerodynamic transfer function matrix appearing in Equations ( 7), (17) and (18). They are obtained by differentiating the aerodynamic transfer function matrix of the g method, A g (s * ), defined in Equation ( 5), and by accounting for the chained partial derivative of the reduced quantities σ * , ω * to the dimensional quantities σ, ω, respectively.…”
Section: Aeroelastic Sensitivities For the G Methodsmentioning
confidence: 99%
See 1 more Smart Citation
“…This requires the partial derivatives of the aerodynamic transfer function matrix appearing in Equations ( 7), (17) and (18). They are obtained by differentiating the aerodynamic transfer function matrix of the g method, A g (s * ), defined in Equation ( 5), and by accounting for the chained partial derivative of the reduced quantities σ * , ω * to the dimensional quantities σ, ω, respectively.…”
Section: Aeroelastic Sensitivities For the G Methodsmentioning
confidence: 99%
“…Recently, the p-L method, which recovers a true aerodynamic damping representation from the values at the imaginary axis, has been presented [18]. Even though the aeroelastic eigensensitivities produced by the p-L method could be embedded in the framework presented in this work, they can also be obtained by using its corresponding generalized state-space form.…”
Section: Aerodynamic Damping Approximationsmentioning
confidence: 99%
“…Moreover, due to the model construction method (see e.g. [51] or [50]), the E matrix may also be rank deficient. Here, due to the additional double derivative and delay structure added to accurately describe the gust disturbance effect along the fuselage, rank E = 𝑛 − 6.…”
Section: Actuatorsmentioning
confidence: 99%