SOME RESULTS ON HYPERBOLIC SYSTEMS WITH RELAXATION 被引量：1

SOME RESULTS ON HYPERBOLIC SYSTEMS WITH RELAXATION

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摘要 In this article, first, the authors prove that there exists a unique global smooth solution for the Cauthy problem to the hyperbolic conservation laws systems with relaxation; second, in the large time station, they prove that the global smooth solutions of the hyperbolic conservation laws systems with relaxation converge to rarefaction waves solution at a determined L^P（p ≥ 2） decay rate. In this article, first, the authors prove that there exists a unique global smooth solution for the Cauthy problem to the hyperbolic conservation laws systems with relaxation; second, in the large time station, they prove that the global smooth solutions of the hyperbolic conservation laws systems with relaxation converge to rarefaction waves solution at a determined L^P（p ≥ 2） decay rate.

作者伍锦棠郑永树

机构地区 Department of Mathematics Huaqiao University

出处《Acta Mathematica Scientia》 SCIE CSCD 2006年第4期767-780,共14页 数学物理学报（B辑英文版）

基金 This research is supported by "Foundation of office of overseas Chinese affair under the state council: 03QZR09"

关键词 Hyperbolic systems with relaxation global smoothly solution rarefaction waves decay estimate Hyperbolic systems with relaxation, global smoothly solution, rarefaction waves, decay estimate

分类号 O175.27 [理学—基础数学]

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参考文献2

1李才中,张玉平.关于绝热气动力学方程组整体光滑解存在性的一个结果[J].成都科技大学学报,1990(2):67-73. 被引量：3
2张辉,赵引川.CONVERGENCE RATES TO TRAVELLING WAVES FOR A RELAXATION MODEL WITH LARGE INITIAL DISTURBANCE[J].Acta Mathematica Scientia,2004,24(2):213-227. 被引量：2

二级参考文献26

1Chen G Q, Levermore C D, Liu T P. Hyperbolic conservation laws with stiff relaxation terms and entropy-Comm Pure Appli Math, 1994, 47:787-830.
2Chen G Q, Liu T P. Zero relaxation and dissipative limits for hyperbolic conservation laws. Comm Pure Appl Math, 1993, 46:755-81.
3Chern I L. Long-time effect of relaxation for hyperbolic conservation laws. Comm Math Phys, 1995, 172:39-55.
4Jin S, Xin J. The relaxation schemes for systems of conservation laws in arbitrary space dimensions. Comm Pure Appl Math, 1995, 48:555-63.
5Kawashima S, Matsumura A. Asymptotic stability of travelling wave solutions of system for one-dimensional gas motion. Comm Math Phys, 1985, 101:97-127.
6Lenhart S, Bhat M. Application of distributed parameter control model in wildfile damage management.Math Methods Aool Scil 19921 2:423-39.
7LeVeque R J, Wang J. A linear hyperbolic system with stiff source terms. In: Nonlinear hyperbolic problems: theoretical, applied and computational aspects (Taormina, 1992) 401-8, Notes Numer Fluid Mech, 43, Vieweg, Braunschweig, 1993.
8Liu H L, Woo C W, Yang T. Decay rate for travelling waves of a relaxation model. J Differential Equations,1997, 134:343-67.
9Liu H L, Wang J, Yang T. Stability in a relaxation model with a nonconvex flux. SIAM J Math Anal,1998, 29:18-29.
10Liu T P. Hyperbolic conservation laws with relaxation. Comm Math Phys, 1987,108:153-75.

共引文献3

1郭昌权.具耗散项p-方程组的整体光滑解[J].数学物理学报（A辑）,1997,17(S1):52-56.
2Corrado MASCIA.TWENTY-EIGHT YEARS WITH “HYPERBOLIC CONSERVATION LAWS WITH RELAXATION”[J].Acta Mathematica Scientia,2015,35(4):807-831.
3郑永树.耗散拟线性双曲型方程组的真空问题[J].华侨大学学报（自然科学版）,1992,13(4):442-447. 被引量：2

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1潘荣华.THE NONLINEAR STABILITY OF TRAVELLING WAVE SOLUTIONS FOR A REACTING FLOW MODEL WITH SOURCE TERM[J].Acta Mathematica Scientia,1999,19(1):26-36. 被引量：2
2HSIAOLING,PANRONGHUA.NONLINEAR STABILITY OF RAREFACTION WAVES FOR A RATE-TYPE VISCOELASTIC SYSTEM[J].Chinese Annals of Mathematics,Series B,1999,20(2):223-232. 被引量：1
3W. Lambert,D. Marchesin.ASYMPTOTIC RAREFACTION WAVES FOR BALANCE LAWS WITH STIFF SOURCES[J].Acta Mathematica Scientia,2009,29(6):1613-1628. 被引量：1
4张辉,赵引川.CONVERGENCE RATES TO TRAVELLING WAVES FOR A RELAXATION MODEL WITH LARGE INITIAL DISTURBANCE[J].Acta Mathematica Scientia,2004,24(2):213-227. 被引量：2

引证文献1

1Corrado MASCIA.TWENTY-EIGHT YEARS WITH “HYPERBOLIC CONSERVATION LAWS WITH RELAXATION”[J].Acta Mathematica Scientia,2015,35(4):807-831.

1李歧强,周常森,侯春海,钱积新.具有输入时滞和外部扰动的线性系统的过渡过程估计(英文)[J].控制理论与应用,1999,16(3):452-454.
2S.L. Yang(Institute of Applied Mathematics, Chinese Academy of Sciences, Beijing, China).δ-WAVE FOR 1-D AND 2-D HYPERBOLIC SYSTEMS[J].Journal of Computational Mathematics,1996,14(3):256-262. 被引量：1
3张领海.广义非线性Korteweg－de　Vries方程的初值问题解的衰变估计[J].数学年刊（A辑）,1995,1(1):22-32. 被引量：1
4侯春海,钱积新.关于Razumikhin-Type定理的衰变估计[J].自动化学报,1998,24(5):699-701.
5LI TaTsien.From phenomena of synchronization to exact synchronization and approximate synchronization for hyperbolic systems[J].Science China Mathematics,2016,59(1):1-18. 被引量：2
6呼青英,朱碧,张宏伟.具动力边界条件椭圆方程解的衰减性(英文)[J].Chinese Quarterly Journal of Mathematics,2009,24(3):365-369.
7YANG Lin,HUANG Li-hong,KUANG Feng-lian.L^p-L^q decay estimates of solutions to Cauchy problems of thermoviscoelastic systems[J].Applied Mathematics(A Journal of Chinese Universities),2009,24(4):473-482. 被引量：1
8范丽丽,刘红霞,尹慧.DECAY ESTIMATES OF PLANAR STATIONARY WAVES FOR DAMED WAVE EQUATIONS WITH NONLINEAR CONVECTION IN MULTI-DIMENSIONAL HALF SPACE[J].Acta Mathematica Scientia,2011,31(4):1389-1410. 被引量：2
9Sheng QIAN,Wen Xiang SUN,Xue Ting TIAN.Deviation Property of Periodic Measures in C^1 Non-uniformly Hyperbolic Systems with Limit Domination[J].Acta Mathematica Sinica,English Series,2012,28(9):1727-1740. 被引量：3
10CharlesBu RandyShull 等.WELL—POSEDNESS，DECAY ESTIMATES AND BLOW—UP THEOREM FOR THE FORCED NLS[J].Journal of Partial Differential Equations,2001,14(1):61-70.

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2006年第4期

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