Local and global strong solutions to a reduced model for inviscid micropolar fluids

Abstract

This paper investigates the well-posedness issue for a reduced two-dimensional model of micropolar fluids. This reduced model presents a coupling between an Euler-type equation for the velocity field of the fluid and a transport-diffusion equation for the microrotation field (which is a scalar field, in this setting). We establish the local existence and uniqueness of strong solutions in the scale of Besov space Bsp,1 having regularity index s≥1+2/p. Furthermore, in the subcritical case when s>1+2/p, we prove that these solutions exist globally in time. The global persistence of regularity in the critical setting s=1+2/p remains open.