A Pressure Associated with a Weak Solution to the Navier-Stokes Equations with Navier's Boundary Condition

Abstract

We show that if u is a weak solution to the Navier-Stokes initial-boundary value problem with Navier's slip boundary conditions in QT:=×(0,T), where is a domain in R3, then an associated pressure p exists as a distribution with a certain structure. Furthermore, we also show that if is a "smooth" domain in R3 then the pressure is represented by a function in QT with a certain rate of integrability. Finally, we study the regularity of the pressure in sub-domains of QT, where u satisfies Serrin's integrability conditions.