Vanishing viscosity solutions of nonlinear hyperbolic systems
成果类型:
Article
署名作者:
Bianchini, S; Bressan, A
刊物名称:
ANNALS OF MATHEMATICS
ISSN/ISSBN:
0003-486X
DOI:
10.4007/annals.2005.161.223
发表日期:
2005
页码:
223-342
关键词:
2x2 conservation-laws
front-tracking
general systems
WEAK SOLUTIONS
uniqueness
STABILITY
EXISTENCE
waves
EQUATIONS
scheme
摘要:
We consider the Cauchy problem for a strictly hyperbolic, n x n system in one-space dimension: u(t) + A(u)u(x) = 0, assuming that the initial data have small total variation. We show that the solutions of the viscous approximations u(t) + A(u)u(x) = epsilon u(xx) are defined globally in time and satisfy uniform BV estimates, independent of e. Moreover, they depend continuously on the initial data in the L-1 distance, with a Lipschitz constant independent of t, epsilon. Letting epsilon -> 0, these viscous solutions converge to a unique limit, depending Lipschitz continuously on the initial data. In the conservative case where A = Df is the Jacobian of some flux function f : R-n -> R-n, the vanishing viscosity limits are precisely the unique entropy weak solutions to the system of conservation laws u(t) + f (U)(x) = 0.