Non Uniqueness of power-law flows

Abstract

We apply the technique of convex integration to obtain non-uniqueness and existence results for power-law fluids, in dimension d 2. For the power index q below the compactness threshold, i.e. q ∈ (1, 2dd+2), we show ill-posedness of Leray-Hopf solutions. For a wider class of indices q ∈ (1, 3d+2d+2) we show ill-posedness of distributional (non-Leray-Hopf) solutions, extending the seminal paper of Buckmaster and Vicol. In this wider class we also construct non-unique solutions for every datum in L2.