We introduce a new technique to analyze free vibration of a string with time-varying length by dealing with traveling waves. When the string length is varied, the natural frequencies and vibration energy are not constant. Thus, free response is not represented by discrete standing waves but by traveling waves, and a given phase of oscillation travels along the string. String tension and nonzero instantaneous transverse velocity at the moving boundary results in energy variation. When the string undergoes retraction, free vibration energy increases exponentially with time, causing dynamic instability. The new wave technique gives the time-varying natural frequency and the exact amount of energy transferred into the vibrating string at the moving boundary.

1.
Downer
,
J. D.
, and
Park
,
K. C.
,
1993
, “
Formulation and Solution of Inverse Spaghetti Problem: Application to Beam Deployment Dynamics
,”
AIAA J.
,
31
, pp.
339
347
.
2.
Tadikonda
,
S. K.
, and
Baruh
,
H.
,
1992
, “
Dynamics and Control of a Translating Flexible Beam With a Prismatic Joint
,”
ASME J. Dyn. Syst., Meas., Control
,
114
, pp.
422
427
.
3.
Carrier
,
G. F.
,
1949
, “
The Spagetti Problem
,”
Am. Math. Monthly
,
56
, pp.
669
672
.
4.
Renshaw
,
A. A.
,
1997
, “
Energetics of Winched Strings
,”
ASME J. Vibr. Acoust.
,
119
, No.
4
, pp.
643
644
.
5.
Wickert
,
J. A.
, and
Mote
,
C. D.
,
1988
, “
Current Research on the Vibration and Stability of Axially Moving Materials
,”
Shock Vib. Dig.
,
20
, pp.
3
13
.
6.
Li
,
G. X.
, and
Paidoussis
,
M. P.
,
1993
, “
Pipes Conveying Fluid: A Model of Dynamical Problem
,”
J. Fluids Struct.
,
7
, pp.
137
204
.
7.
Lee
,
S.-Y.
, and
Mote
,
C. D.
,
1997
, “
A Generalized Treatment of the Energetics of Translating Continua, Part I: Strings and Tensioned Pipes
,”
J. Sound Vib.
,
204
, pp.
735
753
.
8.
Lee
,
S.-Y.
, and
Mote
,
C. D.
,
1998
, “
Traveling Wave Dynamics in a Translating String Coupled to Stationary Constraints: Energy Transfer and Mode Localization
,”
J. Sound Vib.
,
212
, pp.
1
22
.
9.
Yamamoto
,
T.
,
Yasuda
,
K.
, and
Kato
,
M.
,
1978
, “
Vibrations of a String With Time-Variable Length
,”
Bull. JSME
,
21
, pp.
1677
1684
.
10.
Kotera
,
T.
,
1978
, “
Vibrations of String With Time-Varying Length
,”
Bull. JSME
,
21
, pp.
1469
1474
.
11.
Ram
,
Y. M.
, and
Caldwell
,
J.
,
1996
, “
Free Vibration of a String With Moving Boundary Conditions by the Method of Distorted Images
,”
J. Sound Vib.
,
194
, No.
1
, pp.
35
47
.
12.
Terumichi, Y., and Ohtsuka, M., et al., 1993, “Nonstationary Vibrations of a String With Time-Varying Length and a Mass-Spring System Attached at the Lower End,” Dynamics and Vibration of Time-Varying Systems and Structures, DE-Vol. 56, ASME, New York, pp. 63–69.
13.
Cremer, L., Heckel, M., and Ungar, E. E., 1988, Structure-Borne Sound, Springer–Verlag, Berlin.
14.
Mead
,
D. J.
,
1994
, “
Waves and Modes in Finite Beams: Application of the Phase-Closure Principle
,”
J. Sound Vib.
,
171
, pp.
695
702
.
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