Global solutions to Stokes-Magneto equations with fractional dissipations

Abstract

In this paper, we investigate a Stokes-Magneto system with fractional diffusions. We first deal with the non-resistive case in Td and establish the local and global well-posedness with initial magnetic field b0∈ Hs(Td). We also show the existence of a unique mild solution of the resistive case with initial data b0 in the critical Lp(Rd) space. Moreover, we show that \|b(t)\|Lp converges to zero as t→∞ when the initial data is sufficiently small.

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