On an almost sharp Liouville type theorem for fractional Navier-Stokes equations

Abstract

We investigate existence, Liouville type theorems and regularity results for the 3D stationary and incompressible fractional Navier-Stokes equations: in this setting the usual Laplacian is replaced by its fractional power (-)α2 with 0<α<2. By applying a fixed point argument, weak solutions can be obtained in the Sobolev space Hα2(R) and if we add an extra integrability condition, stated in terms of Lebesgue spaces, then we can prove for some values of α that the zero function is the unique smooth solution. The additional integrability condition is almost sharp for 3/5<α<5/3. Moreover, in the case 1<α<2 a gain of regularity is established under some conditions, however the study of regularity in the regime 0<α≤ 1 seems for the moment to be an open problem.

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