This paper is concerned with the generation and application of semi-infinite Helmholtz elements in accordance with the decay function periodic infinite elements proposed by Bettess (1992). In combination with finite Helmholtz elements, they determine the soundwaves radiated by a vibrating gearbox excited by an impact hammer. The normal velocities on the surface of the gearbox have been measured for a number of different frequencies in order to obtain the dominating frequencies of vibration. Then the velocities of several dominating frequencies are applied as a boundary condition for the simulation of the sound emitted by the structure. The numerical results of the finite element calculations are compared with values obtained by measurement of the sound intensity. It is concluded that semi-infinite Helmholtz elements are as good and as easy to use as measurement techniques in order to identify the zones of main radiation. The deviation of measured and calculated emitted sound power is acceptable.

1.
Bettess
P.
,
1977
, “
Infinite elements
,”
Int. J. for Num. Meth. in Engrg.
, Vol.
11
, pp.
53
64
.
2.
Bettess
P.
,
1980
, “
More on Infinite Elements
,”
Int. J. for Num. Meth. in Engrg.
, Vol.
15
, pp.
1613
1626
.
3.
Bettess, P., 1992, Infinite Elements, Penshaw Press, Sunderland.
4.
Bettess
P.
, and
Zienkiewicz
O. C.
,
1977
, “
Diffraction and Refraction of Surface Waves Using Finite and Infinite Elements
,”
Int. J. for Num. Meth. in Engrg.
, Vol.
11
, pp.
1271
1290
.
5.
Burton
A. J.
, and
Miller
G. F.
,
1971
, “
The Application of Integral Equation Methods to the Numerical Solution of Some Exterior Boundary-value Problem
,”
Proc. Roy. Soc. Land.
, Vol.
A323
, pp.
201
210
.
6.
Medina
F.
, and
Taylor
R. L.
,
1983
, “
Finite Element Techniques for Problems for Unbounded Domains
,”
Int. J. for Num. Meth. in Engrg.
, Vol.
19
, pp.
1209
1226
.
7.
Schenk
H. A.
,
1968
, “
Improved Integral Formulation for Acoustic Radiation Problems
,”
J. Acoust. Soc. Am.
, Vol.
44
, No.
1
, pp.
41
58
.
8.
Zhao
C.
, and
Valliappan
S.
,
1993
, “
A Dynamic Infinite Element for Three-Dimensional Infinite-Domain Wave Problems
,”
Int. J. for Num. Meth. in Engrg.
, Vol.
36
, pp.
2567
2580
.
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