报告摘要:
| After reformulating the incompressible Euler-αequations in 3D periodic box , one obtains that there exists a unque classical solution of Euler-αequations in uniform time interval independent ofα. It is shown that the solutions of the Euler-αconverge to the corresponding solutions of Euler equations in L2 in space, uniformly in time. In the sequel, it follows that the Hs(s > n/2 + 1) solutions of Euler-αequations exist in fixed sub-interval of the maximum existing interval for Euler equations provided that initial is regular enough andαis sufficiently small.
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