Global-in-time probabilistically strong solutions to stochastic power-law equations: existence and non-uniqueness

Abstract

We are concerned with the power-law fluids driven by an additive stochastic forcing in dimension d≥3. For the power index r∈(1,3d+2d+2), we establish existence of infinitely many global-in-time probabilistically strong and analytically weak solutions in Lploc([0,∞);L2) C([0,∞);W1,\1,r-1\),p≥1 for every divergence free initial condition in L2 W1,\1,r-1\. This result in particular implies non-uniqueness in law. Our result is sharp in the three dimensional case in the sense that the solution is unique if r≥ 3d+2d+2.