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FREE BOUNDARY PROBLEM FOR AN INCOMPRESSIBLE IDEAL FLUID WITH SURFACE TENSION

    https://doi.org/10.1142/S0218202502002306Cited by:42 (Source: Crossref)
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    Abstract

    We prove that a free boundary problem for an incompressible Euler equation with surface tension is uniquely solvable, locally in time, in a class of functions of finite smoothness. Moreover, it is shown that the solution of this problem converges to the solution of the problem without surface tension as the coefficient of the surface tension tends to zero.

    AMSC: 35Q35, 35R35, 76C05