Sharp and strong non-uniqueness for the magneto-hydrodynamic equations

Abstract

In this paper, we prove a sharp and strong non-uniqueness for a class of weak solutions to the three-dimensional magneto-hydrodynamic (MHD) system. More precisely, we show that any weak solution (v,b)∈ LptL∞x is non-unique in LptL∞x with 1 p<2, which reveals the strong non-uniqueness, and the sharpness in terms of the classical Ladyzhenskaya-Prodi-Serrin criteria at endpoint (2, ∞). Moreover, for any 1 p<2 and ε>0, we construct non-Leray-Hopf weak solutions in LptL∞x L1tC1-ε. The results of Navier-Stokes equations in 1Cheskidov imply the sharp non-uniqueness of MHD system with trivial magnetic field b. Our result shows the non-uniqueness for any weak solution (v,b) including non-trivial magnetic field b.

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