A Note on Stability of Longitudinal Vibrations of an Inhomogeneous Beam
Prasanta Kumar Nandi, Ganesh Chandra Gorain, Samarjit Kar
DOI: 10.4236/am.2012.31003   PDF    HTML   XML   5,106 Downloads   8,909 Views   Citations


In this paper, we have considered an inhomogeneous beam with a damping distributed along the length of the beam. The beam is clamped at both ends and is assumed to vibrate longitudinally. We have estimated the total energy of the system at any time t. By constructing suitable Lyapunov functional, it is established directly that the energy of this system decays exponentially.

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Nandi, P. , Gorain, G. and Kar, S. (2012) A Note on Stability of Longitudinal Vibrations of an Inhomogeneous Beam. Applied Mathematics, 3, 19-23. doi: 10.4236/am.2012.31003.

1. Introduction

In the last few decades the use of flexible structures is on rise. Research in the area of stabilization of vibrations of flexible structures like strings, beams, plates has been gaining importance since early seventies. The study of the stabilization for these problems is significant in the sense to suppress the vibrations to assure a good performance of the overall system.

The vibrations of flexible structures are usually nonlinear in practice. As the non-linear study of such structures is rather cumbersome for analytical treatment, so linearized mathematical models are chosen for simplicity and concise results. The linearized vibrations of flexible structures are usually governed by partial differential equations, particularly, the second order wave equation and the fourth-order Euler-Bernoulli beam equation. Several authors have established stabilization for the wave equation in a bounded domain (cf. G. Chen [1,2], J. Lagnese [3,4], J. L. Lions [5], V. Komornik [6] and the references therein). There are different types of stability for the vibrations of flexible structures and the most important of all these is the uniform stability. Recently, P. K. Nandi, G. C. Gorain and S. Kar [7] has established the uniform exponential stabilization of a solar panel for flexural modes of vibrations. The exponential energy decay estimate is established by Yaojun Ye [8] in case of nonlinear Kirchoff-type vibrations.

The energy decay estimate in developing the theory of stabilization over distributed parameter system in view of its application in various flexible structures has been established by several authors (cf. G. Chen [1,2], J. Lagnese [3,4], J. L. Lions [5], V. Komornik and E. Zuazua [9]). The question of uniform stabilization or point-wise stabilization of Euler-Bernoulli beams or serially connected beams has been studied by a number of authors (cf. J. L. Lions [5], K. Ammari and M. Tuesnak [10], K. Liu and Z. Liu [11], K. Nagaya [12], R. Rebarbery [13] etc.).

2. Mathematical Formulation of the Problem

We consider a flexible inhomogeneous beam of length which is clamped at both ends. It is initially set to vibrate in the longitudinal direction along axis. At time, if is the longitudinal displacement of the beam at a position, then it satisfies the differential equation (cf. K. Liu and Z. Liu [11])


where the coefficients, and are functions of for a general inhomogeneous beam with

For a clamped beam, the boundary conditions are 


Let the beam be set to vibrate with initial values 


3. Energy of the System

The total energy E(t) of the System (1)-(3) at time t is defined by


Differentiating (4) with respect to t and using (1), we obtain 


where the integration is performed by parts and the boundary conditions in (2) are used. Integrating (5) over [0, t], we get




In view of (5), the rate of change of energy with time is negative, so the energy of the system is dissipating with time. Our aim in this work is to establish the uniform exponential decay of this energy.

Now the estimate (6) implies that, if and, where


is the subspace of the classical Sobolev space 


of real valued functions of order one, then for every Hence the System (1)-(3) has a unique solution for

4. Uniform Stability Result and Proof

The main result of this paper can be stated in the following theorem.

Theorem 1. Let be a solution of the system (1)-(3) with the initial values Then the total energy of the system decays uniformly exponentially with time, that means, the energy satisfies the relation 


for some finite reals and, both being independent of time.

The theorem will be proved using the following results. For any real number we have by the CauchySchwartz’s inequality 


By Poincare type Scheeffer’s inequality [14], we have


By mean value theorem of integral calculus, there are reals, , , , satisfying 






Next we consider the following lemmas:

Lemma 1. For every solution of the system (1)-(3), the time derivative of the functional (cf. G. C. Gorain [15], G. C. Gorain and S. K. Bose [16]) defined by 




Proof: Differentiating (18) with respect to and using the equation (1), we obtain


Integrating by parts and using the boundary Conditions (2) and the energy Identity (4), we get 


Hence the lemma.

Lemma 2. For every solution of the System (1)-(3), an estimate of the functional is given by




Proof: We can estimate the 1st term (18) as,




Again, we can estimate the 2nd term (18) as, 


Adding (24) and (26), the lemma follows immediately.

Proof of Theorem 1: Proceeding as in G. C. Gorain [15] and G. C. Gorain and S. K. Bose [16], we define energy like Lyapunov functional by


where is a small constant.

In view of Lemma 2, the functional defined by (27) can be estimated as


Since, we may assume that 


so that

Differentiating (27) with respect to, and using (5) and (19), we obtain 


Hence, using the above relation (13) and (16), we can write (30) as 


Since is small, we may choose further 


so that the differential relation (31) reduces to 


Invoking the Inequality (28), the relation (33) leads to the differential inequality 




Multiplying (34) by and integrating from 0 to, we obtain 


Applying again the inequality (28) in (36), we get 




Hence the theorem.

5. Conclusion

We have established here the uniform stabilization of the vibrations of an inhomogeneous beam which is clamped at both ends. The result is achieved directly by means of an exponential energy decay estimate. It is significant in the sense that the solution of the system given by (1)-(3) converges uniformly to zero as time tends to. The result shows that the vibrations of the inhomogeneous beam decay rapidly for large value of. Again


shows that exponential decay rate being a function of will be maximum for largest admissible value of.

Conflicts of Interest

The authors declare no conflicts of interest.


[1] G. Chen, “Energy Decay Estimates and Exact Boundary-Value Controllability for the Wave Equation in a Bounded Domain,” Journal de Mathématiques Pures et Appliquées, Vol. 58, 1979, pp. 249-273.
[2] G. Chen, “A Note on the Boundary Stabilization of the Wave Equation,” SIAM Journal of Control and Optimization, Vol. 19, No. 1, 1981, pp. 106-113. doi:10.1137/0319008
[3] J. Lagnese, “Note on Boundary Stabilization of Wave Equations,” SIAM Journal of Control and Optimization, Vol. 26, No. 5, 1988, pp. 1250-1256. doi:10.1137/0326068
[4] J. Lagnese, “Decay of Solutions of Wave Equations in a Bounded Region with Boundary Dissipation,” Journal of Differential Equations, Vol. 50, No. 2, 1983, pp. 163-182. doi:10.1016/0022-0396(83)90073-6
[5] J. L. Lions, “Exact Controllability, Stabilization and Perturbations for Distributed Systems,” SIAM Review, Vol. 30, No. 1, 1988, pp. 1-68. doi:10.1137/1030001
[6] V. Komornik, “Rapid Boundary Stabilization of Wave Equations,” SIAM Journal of Control and Optimization, Vol. 29, No. 1, 1991, pp. 197-208. doi:10.1137/0329011
[7] P. K. Nandi, G. C. Gorain and S. Kar, “Uniform Exponential Stabilization for FLexural Vibrations of a Solar Panel,” Applied Mathematics, Vol. 2, No. 6, 2011, pp. 661-665. doi:10.4236/am.2011.26087
[8] Y. J. Ye, “On the Exponential Decay of Solutions for Some Kirchoff-Type Modelling Equations with Strong Dissipation,” Applied Mathematics, Vol. 1, No. 6, 2010, pp. 529-533. doi:10.4236/am.2010.16070
[9] V. Komornik and E. Zuazua, “A Direct Method for Boundary Stabilization of the Wave Equation,” Journal de Mathématiques Pures et Appliquées, Vol. 69, No. 1, 1990, pp. 33-54.
[10] K. Ammari and M. Tuesnak, “Stabilization of Bernoulli-Euler Beams by Means of a Point FEedback Force,” SIAM Journal of Control and Optimization, Vol. 39, No. 4, 2000, pp. 1160-1181. doi:10.1137/S0363012998349315
[11] K. Liu and Z. Liu, “Exponential Decay of Energy of the Euler-Bernoulli Beam with Locally Distributed Kelvin-Voigt Damping,” SIAM Journal of Control and Optimization, Vol. 36, No. 4, 1998, pp. 1086-1098. doi:10.1137/S0363012996310703
[12] K. Nagaya, “Method of Control of Flexible Beams Subject to Forced Vibrations by Use of Inertia Force Cancellations,” Journal of Sound and Vibration, Vol. 184, No. 2, 1995, pp. 184-194. doi:10.1006/jsvi.1995.0311
[13] R. Rebarbery, “Exponential Stability of Coupled Beams with Dissipative Joints: A Frequency Domain Approach,” SIAM Journal of Control and Optimization, Vol. 33, No. 1, 1995, pp. 1-28. doi:10.1137/S0363012992240321
[14] D. S. Mitrinovi?, J. E. Pe?ari? and A. M. Fink, “Inequalities Involving Functions and Their Integrals and Derivatives,” Kluwer, Dordrecht, 1991.
[15] G. C. Gorain, “Exponential Energy Decay Estimate for the Solutions of n-Dimensional Kirchhoff Type Wave Equation,” Applied Mathematics and Computation, Vol. 177, No. 1, 2006, pp. 235-242. doi:10.1016/j.amc.2005.11.003
[16] G. C. Gorain and S. K. Bose, “Exact Controllability and Boundary Stabilization of Torsional Vibrations of an Internally Damped Flexible Space Structures,” Journal of Optimization Theory and Applications, Vol. 99, No. 2, 1998, pp. 423-442. doi:10.1023/A:1021778428222

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