2012
DOI: 10.4007/annals.2012.175.2.9
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Rayleigh-Taylor breakdown for the Muskat problem with applications to water waves

Abstract: The Muskat problem models the evolution of the interface between two different fluids in porous media. The Rayleigh-Taylor condition is natural to reach linear stability of the Muskat problem. We show that the RayleighTaylor condition may hold initially but break down in finite time. As a consequence of the method used, we prove the existence of water waves turning.

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Cited by 143 publications
(223 citation statements)
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“…In the case with small initial data, it is possible to use the parabolic character of the equation in the stable state (see (13) and (17) for the lineal interpretation) to prove global in time regularity in different situations. For purely surface tension driven fluids (g = 0) see results in [29,18].…”
Section: Mathematical Resultsmentioning
confidence: 99%
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“…In the case with small initial data, it is possible to use the parabolic character of the equation in the stable state (see (13) and (17) for the lineal interpretation) to prove global in time regularity in different situations. For purely surface tension driven fluids (g = 0) see results in [29,18].…”
Section: Mathematical Resultsmentioning
confidence: 99%
“…A fascinating behavior of Muskat solution, which can be proved analytically, is finite time singularity formation starting from regular stable initial data. In [13] it is proved that in the case µ 1 = µ 2 and τ = 0 there are solutions of the Muskat equation with initial interfaces being certain smooth stable graphs, which enter the unstable regime, where the interface is no longer a graph, in finite time. In particular there exists a time t p in which…”
Section: Mathematical Resultsmentioning
confidence: 99%
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“…Our work on Muskat is joint with Angel Castro, Diego Cordoba, Francisco Gancedo and Maria Lopez-Fernandez [7,8]. Regarding alpha-patches, we discuss the work of Diego Cordoba, Marco Fontelos, Ana Mancho and José Rodrigo [16].…”
Section: Formation Of Singularities In Fluid Interfacesmentioning
confidence: 99%