On existence of local and global strong solutions for the stochastic tamed Navier-Stokes equations on R3

Abstract

We study the existence of local and global strong solutions for the stochastic tamed Navier--Stokes equations on the whole space R3, driven by multiplicative Wiener noise and compensated Lévy jump noise. For p > 3, we first prove the existence of a pathwise unique maximal local Lp-strong solution for divergence-free, F0-measurable initial data in Lp(Ω; Lp(R3;R3)). For initial data additionally belonging to L2(Ω; H1(R3;R3)), we overcome the non-local pressure obstruction inherent to the whole space, to establish the existence of a pathwise unique global strong solution.