Well-Posedness of the Cauchy Problem

Holden, Helge; Risebro, Nils Henrik

doi:10.1007/978-3-662-47507-2_7

Helge Holden¹⁵ &
Nils Henrik Risebro¹⁶

Part of the book series: Applied Mathematical Sciences ((AMS,volume 152))

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Abstract

The goal of this chapter is to show that the limit found by front tracking, that is, the weak solution of the initial value problem

$$\displaystyle u_{t}+f(u)_{x}=0,\quad u(x,0)=u_{0}(x),$$

(7.1)

is stable in L ¹ with respect to perturbations in the initial data. In other words, if $v=v(x,t)$ is another solution found by front tracking, then

$$\displaystyle{\left\|u(\,\cdot\,,t)-v(\,\cdot\,,t)\right\|}_{1}\leq C{\left\|u_{0}-v_{0}\right\|}_{1}$$

for some constant C. Furthermore, we shall show that under some mild extra entropy conditions, every weak solution coincides with the solution constructed by front tracking.

Ma per seguir virtute e conoscenza. — Dante Alighieri (1265–1321), La Divina Commedia Hard to comprehend? It means ‘‘[but to] pursue virtue and knowledge.’’

Ma per seguir virtute e conoscenza.

— Dante Alighieri (1265–1321), La Divina Commedia

Hard to comprehend? It means ‘‘[but to] pursue virtue and knowledge.’’

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Notes

1.
Rademacher’s theorem states that a Lipschitz function is differentiable almost everywhere; see 64; , p. 81.
2.
A Borel measure μ is regular if it is outer regular on all Borel sets (i.e., $\mu(B)=\inf\{\mu(A)\mid A\supseteq B, \text{$A$ open}\}$ for all Borel sets B) and inner regular on all open sets (i.e., $\mu(U)=\sup\{\mu(K)\mid K\subset U, \text{$K$ compact}\}$ for all open sets U).
3.
The following argument is valid for every jump discontinuity, but will be applied only to jumps in $B_{t,\varepsilon}$.

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Authors and Affiliations

Department of Mathematical Sciences, Norwegian University of Science and Technology, Trondheim, Norway
Helge Holden
Department of Mathematics, University of Oslo, PO Box 1053 Blindern, 0316, Oslo, Norway
Nils Henrik Risebro

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Helge Holden
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Correspondence to Helge Holden .

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Holden, H., Risebro, N.H. (2015). Well-Posedness of the Cauchy Problem. In: Front Tracking for Hyperbolic Conservation Laws. Applied Mathematical Sciences, vol 152. Springer, Berlin, Heidelberg. https://doi.org/10.1007/978-3-662-47507-2_7

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DOI: https://doi.org/10.1007/978-3-662-47507-2_7
Published: 10 December 2015
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-662-47506-5
Online ISBN: 978-3-662-47507-2
eBook Packages: Mathematics and StatisticsMathematics and Statistics (R0)

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