The present thesis is devoted to the study both of strictly hyperbolic operators with low regularity coefficients and of the density-dependent incompressible Euler system. On the one hand, we show a priori estimates for a second order strictly hyperbolic operator whose highest order coefficients satisfy a log-Zygmund continuity condition in time and a log-Lipschitz continuity condition with respect to space. Such an estimate involves a time increasing loss of derivatives...
Mathematical analysis of models of non-homogeneous fluids and of hyperbolic equations with low regularity coefficients / Fanelli, Francesco. - (2012 May 28).
Mathematical analysis of models of non-homogeneous fluids and of hyperbolic equations with low regularity coefficients
Fanelli, Francesco
2012-05-28
Abstract
The present thesis is devoted to the study both of strictly hyperbolic operators with low regularity coefficients and of the density-dependent incompressible Euler system. On the one hand, we show a priori estimates for a second order strictly hyperbolic operator whose highest order coefficients satisfy a log-Zygmund continuity condition in time and a log-Lipschitz continuity condition with respect to space. Such an estimate involves a time increasing loss of derivatives...| File | Dimensione | Formato | |
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1963_5882_PhD_thesis_Fanelli.pdf
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