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• W2758947985 endingPage "1850029" @default.
• W2758947985 startingPage "1850029" @default.
• W2758947985 abstract "In this work, the smoothed finite element method using four-node quadrilateral elements (SFEM-Q4) is employed to resolve underwater acoustic radiation problems. The SFEM-Q4 can be regarded as a combination of the standard finite element method (FEM) and the gradient smoothing technique (GST) from the meshfree methods. In the SFEM-Q4, only the values of shape functions (not the derivatives) at the quadrature points are needed and the traditional requirement of coordinate transformation procedure is not necessary to implement the numerical integration. Consequently, no additional degrees of freedom are required as compared with the original FEM. In addition, the original “overly-stiff” FEM model for acoustic problems (governed by the Helmholtz equation) is properly softened due to the gradient smoothing operations implemented over the smoothing domains and the present SFEM-Q4 possesses a relatively appropriate stiffness of the continuous system. Therefore, the well-known numerical dispersion error for Helmholtz equation is decreased significantly and very accurate numerical solutions can be obtained by using relatively coarse meshes. In order to truncate the unbounded domains and employ the domain-based numerical method to tackle the acoustic radiation in unbounded domains, the Dirichlet-to-Neumann (DtN) map is used to ensure that there are no spurious reflections from the far field. The numerical results from several numerical examples demonstrate that the present SFEM-Q4 is quite effective to handle acoustic radiation problems and can produce more accurate numerical results than the standard FEM." @default.
• W2758947985 created "2017-10-06" @default.
• W2758947985 creator A5030676115 @default.
• W2758947985 creator A5035834957 @default.
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• W2758947985 creator A5056827114 @default.
• W2758947985 creator A5080865198 @default.
• W2758947985 creator A5091138276 @default.
• W2758947985 date "2018-06-05" @default.
• W2758947985 modified "2023-09-24" @default.
• W2758947985 title "Application of Smoothed Finite Element Method to Two-Dimensional Exterior Problems of Acoustic Radiation" @default.
• W2758947985 cites W1126307693 @default.
• W2758947985 cites W1154266763 @default.
• W2758947985 cites W1821675230 @default.
• W2758947985 cites W1853081937 @default.
• W2758947985 cites W1966928055 @default.
• W2758947985 cites W1967649517 @default.
• W2758947985 cites W1970833450 @default.
• W2758947985 cites W1971157784 @default.
• W2758947985 cites W1976538983 @default.
• W2758947985 cites W1977796930 @default.
• W2758947985 cites W1980806037 @default.
• W2758947985 cites W1986293636 @default.
• W2758947985 cites W1993524204 @default.
• W2758947985 cites W1998126990 @default.
• W2758947985 cites W1998263885 @default.
• W2758947985 cites W2001019613 @default.
• W2758947985 cites W2002694174 @default.
• W2758947985 cites W2003017040 @default.
• W2758947985 cites W2003894508 @default.
• W2758947985 cites W2012489356 @default.
• W2758947985 cites W2014073700 @default.
• W2758947985 cites W2017805808 @default.
• W2758947985 cites W2020479085 @default.
• W2758947985 cites W2021615646 @default.
• W2758947985 cites W2026331183 @default.
• W2758947985 cites W2028543164 @default.
• W2758947985 cites W2029786125 @default.
• W2758947985 cites W2037092148 @default.
• W2758947985 cites W2042015995 @default.
• W2758947985 cites W2052382961 @default.
• W2758947985 cites W2052869937 @default.
• W2758947985 cites W2053763921 @default.
• W2758947985 cites W2054407252 @default.
• W2758947985 cites W2063654460 @default.
• W2758947985 cites W2064346720 @default.
• W2758947985 cites W2081580852 @default.
• W2758947985 cites W2081852450 @default.
• W2758947985 cites W2083138253 @default.
• W2758947985 cites W2086316285 @default.
• W2758947985 cites W2089293081 @default.
• W2758947985 cites W2090092527 @default.
• W2758947985 cites W2091907831 @default.
• W2758947985 cites W2100186441 @default.
• W2758947985 cites W2104879053 @default.
• W2758947985 cites W2109831930 @default.
• W2758947985 cites W2132130773 @default.
• W2758947985 cites W2139933850 @default.
• W2758947985 cites W2142136198 @default.
• W2758947985 cites W2155772506 @default.
• W2758947985 cites W2155929505 @default.
• W2758947985 cites W2156644976 @default.
• W2758947985 cites W2156873846 @default.
• W2758947985 cites W2158189438 @default.
• W2758947985 cites W2160366996 @default.
• W2758947985 cites W2162498409 @default.
• W2758947985 cites W2178357734 @default.
• W2758947985 cites W2193624841 @default.
• W2758947985 cites W2218161720 @default.
• W2758947985 cites W2228496482 @default.
• W2758947985 cites W2233319514 @default.
• W2758947985 cites W2287532041 @default.
• W2758947985 cites W2288674139 @default.
• W2758947985 cites W2290089889 @default.
• W2758947985 cites W2290266442 @default.
• W2758947985 cites W2317951161 @default.
• W2758947985 cites W2336544670 @default.
• W2758947985 cites W2345592771 @default.
• W2758947985 cites W2412628818 @default.
• W2758947985 cites W2426676320 @default.
• W2758947985 cites W2467175642 @default.
• W2758947985 cites W2507755745 @default.
• W2758947985 cites W2509320470 @default.
• W2758947985 cites W2513050970 @default.
• W2758947985 cites W2513774172 @default.
• W2758947985 cites W2515049675 @default.
• W2758947985 cites W2522476699 @default.
• W2758947985 cites W2529350659 @default.
• W2758947985 cites W2530669577 @default.
• W2758947985 cites W2541901902 @default.
• W2758947985 cites W2547049117 @default.
• W2758947985 cites W2548965024 @default.
• W2758947985 cites W2554078641 @default.
• W2758947985 cites W2560976911 @default.
• W2758947985 cites W2569673575 @default.
• W2758947985 cites W2610905038 @default.
• W2758947985 cites W2611627721 @default.
• W2758947985 cites W2740689293 @default.

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