首页|A Logarithmic Decay of the Energy for the Hyperbolic Equation with Supercritical Damping
A Logarithmic Decay of the Energy for the Hyperbolic Equation with Supercritical Damping
扫码查看
点击上方二维码区域,可以放大扫码查看
原文链接
NETL
NSTL
万方数据
We are concerned with the following quasilinear wave equation involving variable sources and supercritical damping:utt-div(|▽u|p(x)-2▽u)+|ut|m-2ut=|u|q(x)-2u.Generally speaking,when one tries to use the classical multiplier method to analyze the asymptotic behavior of solutions,an inevitable step is to deal with the integral fΩ|ut|m-2utudx.A usual technique is to apply Young's inequality and Sobolev em-bedding inequality to use the energy function and its derivative to control this integral for the subcritical or critical damping.However,for the supercritical case,the failure of the Sobolev embedding inequality makes the classical method be impossible.To do this,our strategy is to prove the rate of the integral fΩ|u|mdx grows polynomially as a positive power of time variable t and apply the modified multiplier method to obtain the energy functional decays logarithmically.These results improve and extend our previous work[12].Finally,some numerical examples are also given to authenticate our results.
Energy decay estimateasymptotic behaviorp(x)-Laplacian operatorsupercritical damping
LI Xiaolei、GUO Bin
展开 >
School of Mathematics and Statistics,Changchun University of Science and Technology,Changchun 130022,China
School of Mathematics,Jilin University,Changchun 130012,China
NETL
NSTL
万方数据
