DECAY OF ENERGY FOR A DISSIPATIVE ANISOTROPIC ELASTIC SYSTEM

doi:10.1016/S0252-9602(11)60225-7

Acta mathematica scientia,Series B ›› 2011, Vol. 31 ›› Issue (1): 249-258.doi: 10.1016/S0252-9602(11)60225-7

• Articles • Previous Articles Next Articles

DECAY OF ENERGY FOR A DISSIPATIVE ANISOTROPIC ELASTIC SYSTEM

QIN Yu-Ming, LIU Xin, DENG Shu-Xian

Department of Applied Mathematics, College of Sciences, Donghua University, Songjiang 201620, China；College of Information Science
and Technology, Donghua University, Songjiang 201620, China

Received:2008-04-01 Revised:2009-04-09 Online:2011-01-20 Published:2011-01-20
Supported by:
The work was in part supported by the NNSF of China (11031003, 10871040, 10571024)

Abstract

CLC Number:

35L55

QIN Yu-Ming, LIU Xin, DENG Shu-Xian. DECAY OF ENERGY FOR A DISSIPATIVE ANISOTROPIC ELASTIC SYSTEM[J].Acta mathematica scientia,Series B, 2011, 31(1): 249-258.

Trendmd

[1] Adams R A. Sobolev Space. New York: Academic Press, 1975

[2] Beale J T. Spectral properties of an acoustic boundary condtion. Indiana Univ Math J, 1976, 25: 895--917

[3] Beale J T. Acoustic scattering from lacally reacting surfaces. Indiana Univ Math J, 1977, 26: 199--222

[4] Beale J T, Rosencarans S I. Acoustic boundary condtions. Bull Amer Math Soc, 1974, 80: 1276--1278

[5] Dafermos C M. Asymptotic behaviour of solutions of evolution equations//Nonlinear evolution equations. New York: Academic Press, 1978: 103--123

[6] Haraux A. Stabilization of trajectories for some weakly damped hyperbolic equations. J Diff Eqns, 1985, 59: 145--154

[7] Iwasaki N. Local decay of solutions for symmetric hyperbolic systems with dissipative and coercive boundary condition in exterior domains. Publications of the Reaseach Institute for Mathmatical Sciences of Kyoto University, 1969, 5: 193--218

[8] Lions J L. Exact controllability, stabilization and perturbations for distributed systems. SIAM Review, 1988, 30: 1--68

[9] Lions J L, Strauss W A. Some nonlinear evolution equations. Bull Soc Math France, 1965, 93: 43--56

[10] Muñoz Rivera J E, Qin Y. Ploynomial decay for the energy with an acoustic boundary condition. Applied Mathematics Letters, 2003, 16: 249--256

[11] Nakao M. Decay of solutions of some nonlinear evolution equations. J Math Aanl Appl, 1977, 60: 542--549

[12] Nakao M. Energy decay for the wave equation with a degenerate dissipative term. Proceedings of the Royal Society of Edinburgh, 1985, 100: 19--27

[13] Nakao M. Decay of solution of the wave equation with a local degenerate dissipation. Isreal Journal of Mathematics, 1996, 95: 25--42

[14] Nakao M. On the decay of solutions of the wave equation with a local time-dependent nonlinear dissipation. Adv Math Sci Appl, 1997, 7: 317--331

[15] Qin Y, Mu\~noz Rivera J E. Large-time behaviour of energy in elasticity. J Elasticity, 2002, 66: 171--184

[16] Qin Y, Deng S, Su X. Exponential stabilization of energy for a dissipative elastic system (submitted)

[17] Rauch J, Taylor M. Exponential decay of solutions to hyperbolic equations in bounded domains. Indiana Univ Math J, 1974, 24: 79--86

[18] Zuazua E. Exponential decay for the semlinear wave equation with locally distributed damping. Comm P D E, 1990, 15: 205--235

[19] Zuazua E. Uniform stabilization of the wave equation by nonlinear wave equation boundary feedback. SIAM J Control and Optimization, 1990, 28: 466--477

DECAY OF ENERGY FOR A DISSIPATIVE ANISOTROPIC ELASTIC SYSTEM

PDF (PC)

Abstract

Cite this article

share this article

References

Related Articles 8

Metrics

Comments

Recommended 0

[1]	Jun LIU, Dachun YANG, Wen YUAN. LITTLEWOOD-PALEY CHARACTERIZATIONS OF ANISOTROPIC HARDY-LORENTZ SPACES [J]. Acta mathematica scientia,Series B, 2018, 38(1): 1-33.
[2]	WANG Pei-Zhen, CHEN Shao-Chun. A POSTERIORI ERROR ESTIMATION OF THE NEW MIXED ELEMENT SCHEMES FOR SECOND ORDER ELLIPTIC PROBLEM ON ANISOTROPIC MESHES [J]. Acta mathematica scientia,Series B, 2014, 34(5): 1510-1518.
[3]	HAO Xin-Wen, PENG Shao-Yu. THE POINTWISE ESTIMATES TO SOLUTIONS FOR 1-DIMENSIONAL LINEAR THERMO-VISCO-ELASTIC SYSTEM [J]. Acta mathematica scientia,Series B, 2011, 31(4): 1259-1271.
[4]	YE Pei-Xin, HU Xiao-Fei. QUANTUM COMPLEXITY OF THE APPROXIMATION FOR THE CLASSES Β(W_p^r([0, 1]^d)) AND Β(H_p^r([0, 1]^d)) [J]. Acta mathematica scientia,Series B, 2010, 30(5): 1808-1818.
[5]	M. Bildhauer, M. Fuchs. A REMARK ON THE REGULARITY OF VECTOR-VALUED MAPPINGS DEPENDING ON TWO VARIABLES WHICH MINIMIZE SPLITTING-TYPE VARIATIONAL INTEGRALS [J]. Acta mathematica scientia,Series B, 2010, 30(3): 963-967.
[6]	WEN Huan-Yao, DING Shi-Jin. VORTEX DYNAMICS OF THE ANISOTROPIC GINZBURG-LANDAU EQUATION [J]. Acta mathematica scientia,Series B, 2010, 30(3): 949-962.
[7]	Shi Dongyang; Mao Shipeng; Chen Shaochun. A LOCKING-FREE ANISOTROPIC NONCONFORMING FINITE ELEMENT FOR PLANAR LINEAR ELASTICITY PROBLEM [J]. Acta mathematica scientia,Series B, 2007, 27(1): 193-202.
[8]	MA Mo, FANG Gen-Sun. OPTIMIZATION OF ADAPTIVE DIRECT METHOD FOR APPROXIMATE SOLUTION OF INTEGRAL EQUATIONS OF SEVERAL VARIABLES [J]. Acta mathematica scientia,Series B, 2004, 24(2): 228-234.