COLOMBINI, Ferruccio; DEL SANTO, Daniele; FANELLI, Francesco; MÉTIVIER, Guy

doi:10.1080/03605302.2015.1082107

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COLOMBINI, Ferruccio
Dipartimento di Matematica

DEL SANTO, Daniele
Università degli studi di Trieste = University of Trieste

FANELLI, Francesco
Université Claude Bernard Lyon 1 [UCBL]

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Communications in Partial Differential Equations. 2015, vol. 40, p. 2082-2121

Taylor & Francis

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In this paper we study the well-posedness of the Cauchy problem for first order hyperbolic systems with constant multiplicities and with low regularity coefficients depending just on the time variable. We consider Zygmund and log-Zygmund type assumptions, and we prove well-posedness in H ∞ respectively without loss and with finite loss of derivatives. The key to obtain the results is the construction of a suitable symmetrizer for our system, which allows us to recover energy estimates (with or without loss) for the hyperbolic operator under consideration. This can be achievied, in contrast with the classical case of systems with smooth (say Lipschitz) coefficients, by adding one step in the diagonalization process, and building the symmetrizer up to the second order.< Leer menos

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hyperbolic system with constant multiplicities

Zygmund and log-Zygmund conditions

microlocal symmetrizability

energy estimates

H ∞ well-posedness

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The Well-Posedness Issue in Sobolev Spaces for Hyperbolic Systems with Zygmund-Type Coefficients

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