On the controllability of the 1-D isentropic Euler equation

被引：1

作者：

Glass, Olivier ^{[1
]}

机构：

[1] Univ Paris 06, UMR 7598, Lab Jacques Louis Lions, F-75005 Paris, France

来源：

JOURNAL OF THE EUROPEAN MATHEMATICAL SOCIETY | 2007年 / 9卷 / 03期

关键词：

controllability; isentropic Euler equations; hyperbolic systems of conservation laws; entropy solutions; front-tracking algorithm; NONLINEAR HYPERBOLIC SYSTEMS; EXACT BOUNDARY CONTROLLABILITY; 2X2; CONSERVATION-LAWS; LOCAL-CONTROLLABILITY; ATTAINABLE SET; WEAK SOLUTIONS; GAS-DYNAMICS; EXISTENCE; WELL; WAVE;

D O I：

暂无

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

We study the controllability problem for the one-dimensional Euler isentropic system, both in Eulerian and Lagrangian coordinates, by means of boundary controls, in the context of weak entropy solutions. We give a sufficient condition on the initial and final states under which the first one can be steered to the latter.

引用

页码：427 / 486

页数：60

共 50 条

[21] NULL CONTROLLABILITY WITH CONSTRAINTS ON THE STATE FOR THE 1-D KURAMOTO-SIVASHINSKY EQUATION
Gao, Peng
EVOLUTION EQUATIONS AND CONTROL THEORY, 2015, 4 (03): : 281 - 296
[22] Regularity issues for the null-controllability of the linear 1-d heat equation
Micu, Sorin
Zuazua, Enrique
SYSTEMS & CONTROL LETTERS, 2011, 60 (06) : 406 - 413
[23] EXACT CONTROLLABILITY OF THE 1-D WAVE EQUATION FROM A MOVING INTERIOR POINT
Castro, Carlos
ESAIM-CONTROL OPTIMISATION AND CALCULUS OF VARIATIONS, 2013, 19 (01) : 301 - 316
[24] Exact Controllability of the 1-D Wave Equation on Finite Metric Tree Graphs
Sergei Avdonin
Yuanyuan Zhao
Applied Mathematics & Optimization, 2021, 83 : 2303 - 2326
[25] Uniform boundary controllability of a semi-discrete 1-D wave equation
Sorin Micu
Numerische Mathematik, 2002, 91 : 723 - 768
[26] Uniform boundary controllability of a semi-discrete 1-D wave equation
Micu, S
NUMERISCHE MATHEMATIK, 2002, 91 (04) : 723 - 768
[27] STATE ESTIMATION FOR THE HOMOGENEOUS 1-D EULER EQUATION BY UNSCENTED KALMAN FILTERING
Wolff, Sascha
Schaepel, Jan-Simon
Berndt, Phillip
King, Rudibert
PROCEEDINGS OF THE ASME 8TH ANNUAL DYNAMIC SYSTEMS AND CONTROL CONFERENCE, 2015, VOL 2, 2016,
[28] Exact boundary controllability of 3-D Euler equation
Glass, O
ESAIM-CONTROL OPTIMISATION AND CALCULUS OF VARIATIONS, 2000, 5 : 1 - 44
[29] Non-relativistic limits of rarefaction wave to the 1-D piston problem for the isentropic relativistic Euler equations
Ding, Min
Li, Yachun
JOURNAL OF MATHEMATICAL PHYSICS, 2017, 58 (08)
[30] The controllability for the internally controlled 1-D wave equation via a finite difference method
Li, Juntao
Zheng, Yuhan
Zheng, Guojie
Advances in Difference Equations, 2016,

← 1 2 3 4 5 →