Cauchy's Problem for Degenerate Quasilinear Hyperbolic Equations with Measures as Initial Values

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Abstract

The aim of this paper is to discuss the Cauchy problem for degenerate quasilinear hyperbolic equations of the form \frac{∂u}{∂t} + \frac{∂u^m}{∂x} = -u^p, m > 1, p > 0  with measures as initial conditions. The existence and uniqueness of solutions are obtained. In particular, we prove the following results: (1) 0 < p < 1 is a necessary and sufficient condition for the above equations to have extinction property; (2) 0 < p < m is a necessary and sufficient condition for the above equations to have localization property of the propagation of perturbations.

Keywords:

Degenerate quasilinear hyperbolic equations;existence and uniqueness;extinction and positivity;localization
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Cauchy’s Problem for Degenerate Quasilinear Hyperbolic Equations with Measures as Initial Values. (1999). Journal of Partial Differential Equations, 12(2), 149-178. https://global-sci.com/index.php/jpde/article/view/3909

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