The dynamic response of an Euler-Bernoulli beam under moving loads is studied by mode superposition. The inertial effects of the moving load are included in the analysis. The time-dependent equations of motion in modal space are solved by the method of multiple scales. Instability regions of parametric resonance are identified and the moving mass effect is shown to significantly affect the transient response of the beam. Importance of modal interaction arising out of the possible internal resonance is highlighted. While the external resonance is due to the gravity effects of the moving load, the parametric and internal resonance solely depends on the load mass parameter—ratio of the moving load mass to the beam mass. Numerical results show the influence of the load inertia terms on the beam response under either a single moving load or a series of moving loads. [S0739-3717(00)01703-7]

1.
Fryba, L., 1972, Vibration of Solids and Structures Under Moving Loads, Noordhoff, The Netherlands.
2.
Ting
,
E. C.
, and
Yener
,
M.
,
1983
, “
Vehicle-Structure Interactions in Bridge Dynamics
,”
Shock Vibr. Dig.
,
15
, No.
12
, pp.
3
9
.
3.
Olsson
,
M.
,
1985
, “
Finite Element, Modal Co-ordinate Analysis of Structures subjected to Moving Loads
,”
J. Sound Vib.
,
99
, No.
1
, pp.
1
12
.
4.
Katz
,
R.
,
Lee
,
C. W.
,
Ulsoy
,
A. G.
, and
Scott
,
R. A.
,
1987
, “
Dynamic Stability and Response of a Beam Subject to a Deflection Dependent Moving Load
,”
Trans. ASME, J. Vib., Acoust., Stress, Reliab. Des.
,
109
, pp.
361
365
.
5.
Akin
,
J. E.
, and
Mofid
,
M.
,
1989
, “
Numerical Solution for Response of Beams with Moving Mass
,”
J. Struct. Eng.
,
115
, No.
1
, pp.
120
131
.
6.
Duffy
,
D. G.
,
1990
, “
The Response of an Infinite Railroad Track to a Moving, Vibrating Mass
,”
ASME J. Appl. Mech.
,
57
, pp.
66
73
.
7.
Paultre
,
P.
,
Proulx
,
J.
, and
Talbot
,
M.
,
1995
, “
Dynamic Testing Procedures for Highway Bridges Using Traffic Loads
,”
J. Struct. Eng.
,
121
, No.
2
, pp.
362
375
.
8.
Gbadeyan
,
J. A.
, and
Oni
,
S. T.
,
1995
, “
Dynamic Behavior of Beams and Rectangular Plates under Moving Loads
,”
J. Sound Vib.
,
182
, No.
5
, pp.
677
695
.
9.
Lee
,
H. P.
,
1996
, “
Dynamic Response of a Beam with a Moving Mass
,”
J. Sound Vib.
,
191
, No.
2
, pp.
289
294
.
10.
Bolotin, V. V., 1964, The Dynamic Stability of Elastic Systems, Holden Day, San Francisco.
11.
Nelson
,
H. D.
, and
Conover
,
R. A.
,
1971
, “
Dynamic Stability of a Beam Carrying Moving Masses
,”
ASME J. Appl. Mech.
,
38
, pp.
1003
1006
.
12.
Nayfeh, A. H., and Mook, D. T., 1979, Nonlinear Oscillations, Wiley, New York.
13.
Rao
,
G. V.
, and
Iyengar
,
R. N.
,
1991
, “
Internal Resonance and Non-Linear Response of a Cable under Periodic Excitation
,”
J. Sound Vib.
,
149
, No.
1
, pp.
25
41
.
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