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Uniqueness results for nonlocal Hamilton-Jacobi equations |
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| Authors: | Guy Barles Olivier Ley |
| Institution: | a Laboratoire de Mathématiques et Physique Théorique, Fédération Denis Poisson, Université de Tours, Parc de Grandmont, 37200 Tours, France b Laboratoire de Mathématiques, CNRS UMR 6205, Université de Brest, 6 Av. Le Gorgeu BP 809, 29285 Brest, France |
| Abstract: | We are interested in nonlocal eikonal equations describing the evolution of interfaces moving with a nonlocal, non-monotone velocity. For these equations, only the existence of global-in-time weak solutions is available in some particular cases. In this paper, we propose a new approach for proving uniqueness of the solution when the front is expanding. This approach simplifies and extends existing results for dislocation dynamics. It also provides the first uniqueness result for a Fitzhugh-Nagumo system. The key ingredients are some new perimeter estimates for the evolving fronts as well as some uniform interior cone property for these fronts. |
| Keywords: | Nonlocal Hamilton-Jacobi equations Dislocation dynamics Fitzhugh-Nagumo system Nonlocal front propagation Level-set approach Geometrical properties Lower-bound gradient estimate Viscosity solutions Eikonal equation _method=retrieve& _eid=1-s2 0-S0022123609001815& _mathId=si1 gif& _pii=S0022123609001815& _issn=00221236& _acct=C000051805& _version=1& _userid=1154080& md5=207010d5bf2f83de15b9a8fd9fdfd85f')" style="cursor:pointer L1-dependence in time" target="_blank">" alt="Click to view the MathML source" title="Click to view the MathML source">L1-dependence in time |
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