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ON THE ABSENCE OF SPLASH SINGULARITIES IN THE CASE OF TWO-FLUID INTERFACES

Author(s): Fefferman, Charles L; Ionescu, Alexandru D; Lie, Victor

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Abstract: We show that so-called splash singularities cannot develop in the case of locally smooth solutions of the two-fluid interfaces in two dimensions. More precisely, we show that the scenario of formation of singularities discovered by Castro, Cordoba, Fefferman, Gancedo, and Gomez-Serrano in the case of the water waves system, in which the interface remains locally smooth but self-intersects in finite time, is completely prevented in the case of two-fluid interfaces with positive densities.
Publication Date: 15-Feb-2016
Electronic Publication Date: 5-Nov-2015
Citation: Fefferman, Charles, Ionescu, Alexandru D, Lie, Victor. (2016). ON THE ABSENCE OF SPLASH SINGULARITIES IN THE CASE OF TWO-FLUID INTERFACES. DUKE MATHEMATICAL JOURNAL, 165 (417 - 462. doi:10.1215/00127094-3166629
DOI: doi:10.1215/00127094-3166629
ISSN: 0012-7094
EISSN: 1547-7398
Pages: 417 - 462
Type of Material: Journal Article
Journal/Proceeding Title: DUKE MATHEMATICAL JOURNAL
Version: Author's manuscript



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