On the well-posedness and regularity of the wave equation with variable coefficients

被引:17
作者
Guo, Bao-Zhu [1 ]
Zhang, Zhi-Xiong
机构
[1] Acad Sinica, Acad Math & Syst Sci, Beijing 100080, Peoples R China
[2] Univ Witwatersrand, Sch Computat & Appl Math, ZA-2050 Johannesburg, South Africa
[3] Grad Univ Chinese Acad Sci, Beijing 100049, Peoples R China
来源
ESAIM-CONTROL OPTIMISATION AND CALCULUS OF VARIATIONS | 2007年 / 13卷 / 04期
关键词
wave equation; transfer function; well-posed and regular system; boundary control and observation;
D O I
10.1051/cocv:2007040
中图分类号
TP [自动化技术、计算机技术];
学科分类号
0812 ;
摘要
An open- loop system of a multidimensional wave equation with variable coefficients, partial boundary Dirichlet control and collocated observation is considered. It is shown that the system is well- posed in the sense of D. Salamon and regular in the sense of G. Weiss. The Riemannian geometry method is used in the proof of regularity and the feedthrough operator is explicitly computed.
引用
收藏
页码:776 / 792
页数:17
相关论文
共 50 条
[31]   WELL-POSEDNESS OF SYSTEMS OF LINEAR ELASTICITY WITH DIRICHLET BOUNDARY CONTROL AND OBSERVATION [J].
Guo, Bao-Zhu ;
Zhang, Zhi-Xiong .
SIAM JOURNAL ON CONTROL AND OPTIMIZATION, 2009, 48 (04) :2139-2167
[32]   WELL-POSEDNESS AND STABILITY FOR A VISCOELASTIC WAVE EQUATION WITH DENSITY AND TIME-VARYING DELAY IN Rn [J].
Feng, Baowei ;
Yang, Xinguang ;
Su, Keqin .
JOURNAL OF INTEGRAL EQUATIONS AND APPLICATIONS, 2019, 31 (04) :465-493
[33]   Well-posedness and energy decay of solutions to a wave equation with a general boundary control of diffusive type [J].
Benaissa, Abbes ;
Rafa, Said .
MATHEMATISCHE NACHRICHTEN, 2019, 292 (08) :1644-1673
[34]   Global well-posedness of the energy subcritical nonlinear wave equation with initial data in a critical space [J].
Dodson, Benjamin .
ADVANCES IN MATHEMATICS, 2024, 452
[35]   Well-posedness for a class of wave equations with nonlocal weak damping [J].
Liu, Gongwei ;
Peng, Yi ;
Su, Xiao .
MATHEMATICAL METHODS IN THE APPLIED SCIENCES, 2024, 47 (18) :14727-14751
[36]   Unconditional well-posedness for semilinear Schrodinger and wave equations in Hs [J].
Furioli, G ;
Planchon, F ;
Terraneo, E .
HARMONIC ANALYSIS AT MOUNT HOLYOKE, 2003, 320 :147-156
[37]   On global well-posedness for a class of nonlocal dispersive wave equations [J].
Molinet, L ;
Ribaud, F .
DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS, 2006, 15 (02) :657-668
[38]   Global well-posedness of nonlinear wave equation with weak and strong damping terms and logarithmic source term [J].
Lian, Wei ;
Xu, Runzhang .
ADVANCES IN NONLINEAR ANALYSIS, 2020, 9 (01) :613-632
[39]   Well-posedness of the Westervelt equation with higher order absorbing boundary conditions [J].
Kaltenbacher, Barbara ;
Shevchenko, Igor .
JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS, 2019, 479 (02) :1595-1617
[40]   Global Well-Posedness and Stability for a Viscoelastic Plate Equation with a Time Delay [J].
Feng, Baowei .
MATHEMATICAL PROBLEMS IN ENGINEERING, 2015, 2015
12345