On the Stokes system in cylindrical domains

Abstract

The existence of solutions to some initial-boundary value problem for the Stokes system is proved. The result is shown in Sobolev-Slobodetskii spaces such that the velocity belongs to Wr2+σ,1+σ/2(T) and gradient of pressure to Wrσ,σ/2(T), where r∈(1,∞), σ∈(0,1), T=×(0,T). These are special Besov spaces: Br,r2+σ,1+σ/2(T) and Br,rσ,σ/2(T), respectively. The existence is proved by the technique of regularizer.