On the convergence rate of vanishing viscosity approximations for nonlinear hyperbolic systems

Alberto Bressan; Feimin Huang; Yong Wang; Tong Yang

doi:10.1137/120869249

On the convergence rate of vanishing viscosity approximations for nonlinear hyperbolic systems

Alberto Bressan, Feimin Huang, Yong Wang, Tong Yang

Research output: Journal Publications and Reviews › RGC 21 - Publication in refereed journal › peer-review

11 Citations (Scopus)

Abstract

In this paper we study the vanishing viscosity limit of strictly hyperbolic systems, extending the earlier result in [A. Bressan and T. Yang, Comm. Pure Appl. Math., 57 (2004), pp. 1075-1109] to systems where each characteristic field can be either genuinely nonlinear or linearly degenerate. For a given initial data with small total variation, our main estimate shows that the L1 distance between the exact solution u and a viscous approximation ue is bounded by u(t, .) - u ^ε(t, .)L ¹ = O(1) . (1 + t)e1/4. Under the additional assumptions that the integral curves of all linearly degenerate fields are straight lines, we obtain the sharper estimate u(t, .) - u ^ε(t, .)L ¹ = O(1)(1 + t)ε| ln ε|. Copyright © by SIAM.

Original language	English
Pages (from-to)	3537-3563
Journal	SIAM Journal on Mathematical Analysis
Volume	44
Issue number	5
DOIs	https://doi.org/10.1137/120869249
Publication status	Published - 2012
Externally published	Yes

Research Keywords

Bounded variation estimates
Convergence rates
Genuine nonlinearity
Lyapunov functionals
Riemann solution
Strictly hyperbolic
Vanishing viscosity

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title = "On the convergence rate of vanishing viscosity approximations for nonlinear hyperbolic systems",

abstract = "In this paper we study the vanishing viscosity limit of strictly hyperbolic systems, extending the earlier result in [A. Bressan and T. Yang, Comm. Pure Appl. Math., 57 (2004), pp. 1075-1109] to systems where each characteristic field can be either genuinely nonlinear or linearly degenerate. For a given initial data with small total variation, our main estimate shows that the L1 distance between the exact solution u and a viscous approximation ue is bounded by u(t, .) - u ε(t, .)L 1 = O(1) . (1 + t)e1/4. Under the additional assumptions that the integral curves of all linearly degenerate fields are straight lines, we obtain the sharper estimate u(t, .) - u ε(t, .)L 1 = O(1)(1 + t)ε| ln ε|. Copyright {\textcopyright} by SIAM.",

keywords = "Bounded variation estimates, Convergence rates, Genuine nonlinearity, Lyapunov functionals, Riemann solution, Strictly hyperbolic, Vanishing viscosity",

author = "Alberto Bressan and Feimin Huang and Yong Wang and Tong Yang",

year = "2012",

doi = "10.1137/120869249",

language = "English",

volume = "44",

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journal = "SIAM Journal on Mathematical Analysis",

issn = "0036-1410",

publisher = "Society for Industrial and Applied Mathematics",

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TY - JOUR

T1 - On the convergence rate of vanishing viscosity approximations for nonlinear hyperbolic systems

AU - Bressan, Alberto

AU - Huang, Feimin

AU - Wang, Yong

AU - Yang, Tong

PY - 2012

Y1 - 2012

N2 - In this paper we study the vanishing viscosity limit of strictly hyperbolic systems, extending the earlier result in [A. Bressan and T. Yang, Comm. Pure Appl. Math., 57 (2004), pp. 1075-1109] to systems where each characteristic field can be either genuinely nonlinear or linearly degenerate. For a given initial data with small total variation, our main estimate shows that the L1 distance between the exact solution u and a viscous approximation ue is bounded by u(t, .) - u ε(t, .)L 1 = O(1) . (1 + t)e1/4. Under the additional assumptions that the integral curves of all linearly degenerate fields are straight lines, we obtain the sharper estimate u(t, .) - u ε(t, .)L 1 = O(1)(1 + t)ε| ln ε|. Copyright © by SIAM.

AB - In this paper we study the vanishing viscosity limit of strictly hyperbolic systems, extending the earlier result in [A. Bressan and T. Yang, Comm. Pure Appl. Math., 57 (2004), pp. 1075-1109] to systems where each characteristic field can be either genuinely nonlinear or linearly degenerate. For a given initial data with small total variation, our main estimate shows that the L1 distance between the exact solution u and a viscous approximation ue is bounded by u(t, .) - u ε(t, .)L 1 = O(1) . (1 + t)e1/4. Under the additional assumptions that the integral curves of all linearly degenerate fields are straight lines, we obtain the sharper estimate u(t, .) - u ε(t, .)L 1 = O(1)(1 + t)ε| ln ε|. Copyright © by SIAM.

KW - Bounded variation estimates

KW - Convergence rates

KW - Genuine nonlinearity

KW - Lyapunov functionals

KW - Riemann solution

KW - Strictly hyperbolic

KW - Vanishing viscosity

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DO - 10.1137/120869249

M3 - RGC 21 - Publication in refereed journal

SN - 0036-1410

VL - 44

SP - 3537

EP - 3563

JO - SIAM Journal on Mathematical Analysis

JF - SIAM Journal on Mathematical Analysis

IS - 5

ER -

On the convergence rate of vanishing viscosity approximations for nonlinear hyperbolic systems

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