Title of Paper:Coupled FE-BE method for eigenvalue analysis of elastic structures submerged in an infinite fluid domain

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Date of Publication:2017-04-13

Journal:INTERNATIONAL JOURNAL FOR NUMERICAL METHODS IN ENGINEERING

Included Journals:SCIE、EI

Volume:110

Issue:2

Page Number:163-185

ISSN No.:0029-5981

Key Words:fluid-structure interaction; coupled FE-BE method; nonlinear eigenvalue problem; contour integral method; fictitious eigenfrequency; Burton-Miller formulation

Abstract:For thin elastic structures submerged in heavy fluid, e.g., water, a strong interaction between the structural domain and the fluid domain occurs and significantly alters the eigenfrequencies. Therefore, the eigenanalysis of the fluid-structure interaction system is necessary. In this paper, a coupled finite element and boundary element (FE-BE) method is developed for the numerical eigenanalysis of the fluid-structure interaction problems. The structure is modeled by the finite element method. The compressibility of the fluid is taken into consideration, and hence the Helmholtz equation is employed as the governing equation and solved by the boundary element method (BEM). The resulting nonlinear eigenvalue problem is converted into a small linear one by applying a contour integral method. Adequate modifications are suggested to improve the efficiency of the contour integral method and avoid missing the eigenvalues of interest. The Burton-Miller formulation is applied to tackle the fictitious eigenfrequency problem of the BEM, and the optimal choice of its coupling parameter is investigated for the coupled FE-BE method. Numerical examples are given and discussed to demonstrate the effectiveness and accuracy of the developed FE-BE method. Copyright (C) 2016 John Wiley & Sons, Ltd.