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Accuracy and stability of finite element schemes for the duct transmission problem

Accuracy and stability of finite element schemes for the duct transmission problem
Accuracy and stability of finite element schemes for the duct transmission problem
A one-dimensional numerical model is used to investigate the characteristics of finite element computational schemes for linearized acoustical transmission in ducts with flow. Primitive variables and coupled first-order equations are used. The relative performances of Lagrangian and Hermitian elements with Galerkin and residual least squares formulations are assessed. Results of the numerical study are shown to correlate with the characteristics of analytic solutions for the equivalent regular grid difference equations. Galerkin solutions are shown to introduce spurious nonphysical modes which must be eliminated by careful attention to the local resolution requirements of the finite-element mesh. Residual least squares formulations do not introduce spurious numerical modes but result in significant numerical damping. This is particularly severe if Lagrangian elements are used.
0001-1452
1547-1556
Astley, R.J.
cb7fed9f-a96a-4b58-8939-6db1010f9893
Eversman, W.
a48e519b-a759-4b3b-b81f-b987d216d027
Walkington, N.J.
38efa808-a7a9-4e29-a885-75356f0998ef
Astley, R.J.
cb7fed9f-a96a-4b58-8939-6db1010f9893
Eversman, W.
a48e519b-a759-4b3b-b81f-b987d216d027
Walkington, N.J.
38efa808-a7a9-4e29-a885-75356f0998ef

Astley, R.J., Eversman, W. and Walkington, N.J. (1982) Accuracy and stability of finite element schemes for the duct transmission problem. AIAA Journal, 20 (11), 1547-1556. (doi:10.2514/3.51219).

Record type: Article

Abstract

A one-dimensional numerical model is used to investigate the characteristics of finite element computational schemes for linearized acoustical transmission in ducts with flow. Primitive variables and coupled first-order equations are used. The relative performances of Lagrangian and Hermitian elements with Galerkin and residual least squares formulations are assessed. Results of the numerical study are shown to correlate with the characteristics of analytic solutions for the equivalent regular grid difference equations. Galerkin solutions are shown to introduce spurious nonphysical modes which must be eliminated by careful attention to the local resolution requirements of the finite-element mesh. Residual least squares formulations do not introduce spurious numerical modes but result in significant numerical damping. This is particularly severe if Lagrangian elements are used.

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Published date: 1982

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Local EPrints ID: 166499
URI: http://eprints.soton.ac.uk/id/eprint/166499
DOI: doi:10.2514/3.51219
ISSN: 0001-1452
PURE UUID: 224cfa15-2a98-4337-9e56-b3d55ba480ce

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Date deposited: 29 Oct 2010 08:12
Last modified: 14 Mar 2024 02:13

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Contributors

Author: R.J. Astley
Author: W. Eversman
Author: N.J. Walkington

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