Decay Rate for Travelling Waves of a Relaxation Model

Liu, Hailiang; Woo, Ching Wah; Yang, Tong

doi:10.1006/jdeq.1996.3220

Cited by 22 publications

(33 citation statements)

References 11 publications

(17 reference statements)

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“…There are many recent studies concerning the asymptotic convergence of the relaxation systems to the corresponding equilibrium conservation laws as the rate of relaxation tends to zero; see, for example, [3,4,[9][10][11][12][13][14][15][16][17][18]. Most of these results deal with either large-time, nonlinear asymptotic stability or the zero relaxation limit for Cauchy problems for special systems.…”

Section: Introductionmentioning

confidence: 98%

Asymptotic limit of initial boundary value problems for conservation laws with relaxational extensions

Wang

Xin

1998

Comm. Pure Appl. Math.

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Section: Introductionmentioning

confidence: 98%

Asymptotic limit of initial boundary value problems for conservation laws with relaxational extensions

Wang

Xin

1998

Comm. Pure Appl. Math.

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“…Since then, the stability of certain elementary waves was studied by H. Liu, C. Woo, and T. Yang [12], T. Luo [15], T. Luo and Z. P. Xin [16], C. Mascia and R. Natalini [18], M. Mei and T. Yang [22], R. H. Pan [26], C. J. Zhu [31], and P. Zingano [32], etc. The problem on the convergence to the diffusion waves was given by I.-L. Chern in [4].…”

Section: Introduction and The Statement Of Our Main Resultsmentioning

confidence: 99%

Nonlinear Stability of Strong Planar Rarefaction Waves for the Relaxation Approximation of Conservation Laws in Several Space Dimensions

Zhao

2000

Journal of Differential Equations

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In this paper, we show that a strong planar rarefaction wave is nonlinear stable, namely it is an attractor for the relaxation approximation of the scalar conservation laws in several space dimensions. Compared with former results obtained by T. P. Liu (1987, Comm. Math. Phys. 108, 153 175) and T. Luo (1997, J. Differential Equations 133, 255 279), our main novelty lies in the fact that the planar rarefaction waves do not need to be small, and in the one-dimensional case, the initial disturbance can also be chosen arbitrarily large. Academic Press

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“…With m 1 = f (m 0 ) from (1.6), we obtain from the second equation of (1.3) 19 which is equivalent to …”

Section: Phase Transitions In a Relaxation Model Of Mixed Type With Pmentioning

confidence: 99%

Phase Transitions in a Relaxation Model of Mixed Type with Periodic Boundary Condition

Gander

Mei

Schmidt

2010

Applied Mathematics Research eXpress

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We study the asymptotic behavior of solutions for a 2 × 2 relaxation model of mixed type with periodic initial and boundary conditions. We prove that the asymptotic behavior of the solutions and their phase transitions are dependent on the location of the initial data and the size of the viscosity. If the average of the initial data is in the hyperbolic region and the initial data does not deviate too much from its average, we prove that there exists a unique global solution and that it converges time-asymptotically to the average in the same hyperbolic region. No phase transition occurs after initial oscillations. If the average of the initial data is in the elliptic region and the initial data does not deviate too much from its average, and in addition if the viscosity is big, then the solution converges to the average in the same elliptic region, and does not exhibit phase transitions after initial oscillations. If, however, the viscosity is small, numerical evidence indicates that the solution oscillates across the hyperbolic and elliptic regions for all time, exhibiting phase transitions. In this case, we conjecture that the solution converges to an oscillatory standing wave (steady-state solution).

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Decay Rate for Travelling Waves of a Relaxation Model

Cited by 22 publications

References 11 publications

Asymptotic limit of initial boundary value problems for conservation laws with relaxational extensions

Asymptotic limit of initial boundary value problems for conservation laws with relaxational extensions

Nonlinear Stability of Strong Planar Rarefaction Waves for the Relaxation Approximation of Conservation Laws in Several Space Dimensions

Phase Transitions in a Relaxation Model of Mixed Type with Periodic Boundary Condition

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