About the possibility of minimal blow up for Navier-Stokes solutions with data in Hs(R3)
Abstract
Considering initial data in Hs, with 12 s 32, this paper is devoted to the study of possible blowing-up Navier-Stokes solutions such that (T*(u\0) -t)12 (s- 12) \,\, \| u \|\Hs is bounded. Our result is in the spirit of the tremendous works of L. Escauriaza, G. Seregin, and V. Sverak and I. Gallagher, G. Koch, F. Planchon, where they proved there is no blowing-up solution which remain bounded in L3(R3). The main idea is that if such blowing-up solutions exist, they satisfy critical properties.
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