Energy decay of variable-coefficient wave equation with nonlinear acoustic boundary conditions and source term

Hao Jianghao; He Wenhua

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Energy decay of variable-coefficient wave equation with nonlinear acoustic boundary conditions and source term

机译：具有非线性声学边界条件的可变系数波方程的能量衰减和源术语

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摘要

In this paper, we consider a variable-coefficient wave equation with nonlinear acoustic boundary conditions and source term. Using the Riemannian geometry method, we prove the general energy decay of the system corresponds to the ordinary differential equation (ODE), which certainly is stable under some suitable assumptions.

机译：在本文中，我们考虑一种具有非线性声学边界条件和源术语的可变系数波方程。使用riemannian几何方法，我们证明了系统的一般能量衰减对应于普通微分方程（ode），其在一些合适的假设下肯定是稳定的。

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《Mathematical Methods in the Applied Sciences》 |2019年第6期|共15页
作者
Hao Jianghao; He Wenhua;
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作者单位

Shanxi Univ Sch Math Sci Taiyuan 030006 Shanxi Peoples R China;

Shanxi Univ Sch Math Sci Taiyuan 030006 Shanxi Peoples R China;

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原文格式 PDF
正文语种 eng
中图分类数学;
关键词
general decay; nonlinear acoustic boundary; source term; variable coefficients; wave equation;

机译：一般衰减;非线性声学边界;源术语;变系数;波浪方程;
入库时间 2022-08-20 03:43:11

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1. Energy decay of variable-coefficient wave equation with nonlinear acoustic boundary conditions and source term [J] . Hao Jianghao, He Wenhua Mathematical Methods in the Applied Sciences . 2019,第6期

机译：具有非线性声学边界条件的可变系数波方程的能量衰减和源术语
2. Energy decay of a variable-coefficient wave equation with memory type acoustic boundary conditions [J] . Wu Jieqiong, Li Shengjia, Feng Fei Journal of Mathematical Analysis and Applications . 2016,第1期

机译：具有记忆型声边界条件的变系数波动方程的能量衰减
3. Some Nonlinear Wave Equations with Nonlinear Memory Source Term and Acoustic Boundary Conditions [J] . Jong Yeoul Park, Joung Ae Kim Numerical Functional Analysis and Optimization . 2006,第7a8期

机译：具有非线性记忆源项和声边界条件的一些非线性波动方程
4. EXISTENCE AND UNIFORM DECAY OF THE WAVE EQUATION WITH NONLINEAR BOUNDARY DAMPING AND BOUNDARY MEMORY SOURCE TERM [C] . Marcelo Moreira Cavalcanti International ISAAC Congress . 2003

机译：非线性边界阻尼和边界存储源术语波方程的存在与均匀衰减
5. Long-term dynamics of a semilinear wave equation with localized nonlinear dissipation, critical source term, and mixed boundary conditions. [D] . Toundykov, Daniel. 2007

机译：具有局部非线性耗散，临界源项和混合边界条件的半线性波动方程的长期动力学。
6. A Source Term Approach for Generation of One-way Acoustic Waves in the Euler and Navier-Stokes equations [O] . Kazuki Maeda, Tim Colonius -1

机译：在Euler和Navier-Stokes方程中生成单向声波的源项法
7. Global solutions of wave equations with multiple nonlinear source terms under acoustic boundary conditions [O] . Shoubo Jin, Jian Li 2021

机译：声边界条件下具有多个非线性源术语的波动方程的全局解
8. Comment on 'Absorbing Boundary Conditions for Acoustic and Elastic Wave Equations,' by R. Clayton and B. Engquist [R] . Emerman, S. H., Stephen, R. A. 1983

机译：关于“声学和弹性波方程的吸收边界条件”的评论，由R. Clayton和B. Engquist撰写

Energy decay of variable-coefficient wave equation with nonlinear acoustic boundary conditions and source term

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