We study an integro-differential equation that describes the slow erosion of granular flow. The equation is a first order nonlinear conservation law where the flux function includes an integral term. We show that there exist unique traveling wave solutions that connect profiles with equilibrium slope at ±∞. Such traveling waves take very different forms from those in standard conservation laws. Furthermore, we prove that the traveling wave profiles are locally stable, i.e., solutions with monotone initial data approach the traveling waves asymptotically as t → +∞

Guerra, G., Shen, W. (2014). Existence and stability of traveling waves for an integro-differential equation for slow erosion. JOURNAL OF DIFFERENTIAL EQUATIONS, 256(1), 253-282 [10.1016/j.jde.2013.09.003].

Existence and stability of traveling waves for an integro-differential equation for slow erosion

GUERRA, GRAZIANO;
2014

Abstract

We study an integro-differential equation that describes the slow erosion of granular flow. The equation is a first order nonlinear conservation law where the flux function includes an integral term. We show that there exist unique traveling wave solutions that connect profiles with equilibrium slope at ±∞. Such traveling waves take very different forms from those in standard conservation laws. Furthermore, we prove that the traveling wave profiles are locally stable, i.e., solutions with monotone initial data approach the traveling waves asymptotically as t → +∞
Articolo in rivista - Articolo scientifico
Traveling waves; Existence and stability; Integro-differential equation; Conservation law
English
2014
256
1
253
282
none
Guerra, G., Shen, W. (2014). Existence and stability of traveling waves for an integro-differential equation for slow erosion. JOURNAL OF DIFFERENTIAL EQUATIONS, 256(1), 253-282 [10.1016/j.jde.2013.09.003].
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/10281/47515
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