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Let H be a bounded and Lipschitz continuous function. We consider discontinuous viscosity solutions of the Hamilton–Jacobi equation Ut+ H(Ux) = 0 and signed Radon measure valued entropy solutions of the conservation law ut+ [H(u)] x= 0. After having proved a precise statement of the formal relation Ux= u, we establish estimates for the (strictly positive!) times at which singularities of the solutions disappear. Here singularities are jump discontinuities in case of the Hamilton–Jacobi equation and signed singular measures in case of the conservation law.

Discontinuous Solutions of Hamilton–Jacobi Equations Versus Radon Measure-Valued Solutions of Scalar Conservation Laws: Disappearance of Singularities / Bertsch, M.; Smarrazzo, F.; Terracina, A.; Tesei, A.. - In: JOURNAL OF DYNAMICS AND DIFFERENTIAL EQUATIONS. - ISSN 1040-7294. - 35:1(2023), pp. 455-491. [10.1007/s10884-021-09997-x]

Discontinuous Solutions of Hamilton–Jacobi Equations Versus Radon Measure-Valued Solutions of Scalar Conservation Laws: Disappearance of Singularities

Terracina A.;Tesei A.
2023

Abstract

Let H be a bounded and Lipschitz continuous function. We consider discontinuous viscosity solutions of the Hamilton–Jacobi equation Ut+ H(Ux) = 0 and signed Radon measure valued entropy solutions of the conservation law ut+ [H(u)] x= 0. After having proved a precise statement of the formal relation Ux= u, we establish estimates for the (strictly positive!) times at which singularities of the solutions disappear. Here singularities are jump discontinuities in case of the Hamilton–Jacobi equation and signed singular measures in case of the conservation law.
2023
First order hyperbolic conservation laws; Hamilton–Jacobi equation; Singular boundary conditions; Waiting time
01 Pubblicazione su rivista::01a Articolo in rivista
Discontinuous Solutions of Hamilton–Jacobi Equations Versus Radon Measure-Valued Solutions of Scalar Conservation Laws: Disappearance of Singularities / Bertsch, M.; Smarrazzo, F.; Terracina, A.; Tesei, A.. - In: JOURNAL OF DYNAMICS AND DIFFERENTIAL EQUATIONS. - ISSN 1040-7294. - 35:1(2023), pp. 455-491. [10.1007/s10884-021-09997-x]
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11573/1675425
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