Daniele Casagrande, Daniele Del Santo, Martino Prizzi
Published 2018-01-24Version 1
The interest of the scientific community for the existence, uniqueness and stability of solutions to PDE's is testified by the numerous works available in the literature. In particular, in some recent publications on the subject an inequality guaranteeing stability is shown to hold provided that the coefficients of the principal part of the differential operator are Log-Lipschitz continuous. Herein this result is improved along two directions. First, we describe how to construct an operator, whose coefficients in the principal part are not Log-Lipschitz continuous, for which the above mentioned inequality does not hold. Second, we show that the stability of the solution is guaranteed, in a suitable functional space, if the coefficients of the principal part are Osgood continuous.
Conditional stability for backward parabolic equations with $\rm{Log}\rm{Lip}_t \times \rm{Lip}_x$-coefficients
On backward uniqueness for parabolic equations when Osgood continuity of the coefficients fails at one point
Conditional stability of unstable viscous shocks
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