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Applicable Analysis
An International Journal
Volume 88, 2009 - Issue 7
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Original Articles

Polynomial stability of solutions for a system of non-linear viscoelastic equations

Shengqi Yu Department of Mathematics, Southeast University, Nanjing 210096, ChinaCorrespondence[email protected]
Pages 1039-1051 | Received 17 Mar 2009, Accepted 08 Jun 2009, Published online: 21 Sep 2010

Citations (16)

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Read on this site (3)

Gang Li, Yun Sun & Wenjun Liu. (2014) Arbitrary decay of solutions for a singular nonlocal viscoelastic problem with a possible damping term. Applicable Analysis 93:6, pages 1150-1163.
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Gang Li, Linghui Hong & Wenjun Liu. (2013) Exponential energy decay of solutions for a system of viscoelastic wave equations of Kirchhoff type with strong damping. Applicable Analysis 92:5, pages 1046-1062.
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Gang Li, Yanan Sun & Wenjun Liu. (2012) Global existence and blow-up of solutions for a strongly damped Petrovsky system with nonlinear damping. Applicable Analysis 91:3, pages 575-586.
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Articles from other publishers (13)

Zhiyong Ma. (2017) Decay Rate for a Viscoelastic Equation with Strong Damping and Acoustic Boundary Conditions. Journal of Applied Mathematics and Physics 05:04, pages 922-932.
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Wenjun Liu. (2014) Arbitrary rate of decay for a viscoelastic equation with acoustic boundary conditions. Applied Mathematics Letters 38, pages 155-161.
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Wenjun Liu, Gang Li & Linghui Hong. (2014) General Decay and Blow-Up of Solutions for a System of Viscoelastic Equations of Kirchhoff Type with Strong Damping. Journal of Function Spaces 2014, pages 1-21.
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N. Tatar. (2013) On a non-dissipative Kirchhoff viscoelastic problem. Journal of Contemporary Mathematical Analysis 48:6, pages 285-296.
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Wenjun Liu. (2013) GENERAL DECAY RATE ESTIMATE FOR THE ENERGY OF A WEAK VISCOELASTIC EQUATION WITH AN INTERNAL TIME-VARYING DELAY TERM. Taiwanese Journal of Mathematics 17:6.
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Wenjun Liu. (2013) General decay of the solution for a viscoelastic wave equation with a time-varying delay term in the internal feedback. Journal of Mathematical Physics 54:4.
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Nasser–eddine Tatar. (2012) A New Class of Kernels Leading to an Arbitrary Decay in Viscoelasticity. Mediterranean Journal of Mathematics 10:1, pages 213-226.
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Nasser-eddine Tatar. (2012) Oscillating kernels and arbitrary decays in viscoelasticity. Mathematische Nachrichten 285:8-9, pages 1130-1143.
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Nasser-eddine Tatar. (2012) Uniform decay in viscoelasticity for kernels with small non-decreasingness zones. Applied Mathematics and Computation 218:15, pages 7939-7946.
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Nasser-Eddine Tatar. (2012) Asymptotic Behavior for a Nondissipative and Nonlinear System of the Kirchhoff Viscoelastic Type. Journal of Applied Mathematics 2012, pages 1-17.
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W. Liu & J. Yu. (2011) Global Existence and Uniform Decay of Solutions for a Coupled System of Nonlinear Viscoelastic Wave Equations with Not Necessarily Differentiable Relaxation Functions. Studies in Applied Mathematics 127:4, pages 315-344.
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Wenjun Liu & Jun Yu. (2011) On decay and blow-up of the solution for a viscoelastic wave equation with boundary damping and source terms. Nonlinear Analysis: Theory, Methods & Applications 74:6, pages 2175-2190.
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Nasser-eddine Tatar. (2011) Arbitrary decays in linear viscoelasticity. Journal of Mathematical Physics 52:1.
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