Sijue Wu scite author profile

We consider the motion of the interface of a 3-D inviscid, incompressible, irrotational water wave, with air region above water region and surface tension zero. We prove that the motion of the interface of the water wave is not subject to Taylor instability, as long as the interface separates the whole 3-D space into two simply connected C 2 C^{2} regions. We prove further the existence and uniqueness of solutions of the full 3-D water wave problem, locally in time, for any initial interface that separates the whole 3-D space into two simply connected regions.

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Almost global wellposedness of the 2-D full water wave problem

2009

Invent. math.

224

320

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Abstract. We consider the problem of global in time existence and uniqueness of solutions of the 3-D infinite depth full water wave problem. We show that the nature of the nonlinearity of the water wave equation is essentially of cubic and higher orders. For any initial interface that is sufficiently small in its steepness and velocity, we show that there exists a unique smooth solution of the full water wave problem for all time, and the solution decays at the rate 1/t.

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Global wellposedness of the 3-D full water wave problem

2010

Invent. math.

210

187

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Sijue Wu

Well-posedness in Sobolev spaces of the full water wave problem in 2-D

Well-posedness in Sobolev spaces of the full water wave problem in 3-D

Almost global wellposedness of the 2-D full water wave problem

Global wellposedness of the 3-D full water wave problem

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