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Zeitschriftenartikel:

F. Achleitner, Y. Ueda:
"Asymptotic stability of traveling wave solutions for nonlocal viscous conservation laws with explicit decay rates";
Journal of Evolution Equations, 18 (2018), 2; S. 923 - 946.



Kurzfassung englisch:
We consider scalar conservation laws with nonlocal diffusion of Riesz-Feller type such as the fractal Burgers equation. The existence of traveling wave solutions with monotone decreasing profile has been established recently (in special cases). We show the local asymptotic stability of these traveling wave solutions in a Sobolev space setting by constructing a Lyapunov functional. Most importantly, we derive the algebraic-in-time decay of the norm of such perturbations with explicit algebraic-in-time decay rates.

Schlagworte:
Nonlocal evolution equations, Riesz-Feller operator, Fractional Laplacian, Traveling wave solutions, Asymptotic stability, Decay rates


"Offizielle" elektronische Version der Publikation (entsprechend ihrem Digital Object Identifier - DOI)
http://dx.doi.org/10.1007/s00028-018-0426-6


Erstellt aus der Publikationsdatenbank der Technischen Universität Wien.