The Two-Dimensional Exterior Stokes Problem, Existence, Regularity and Decay Properties

Abstract: The Stokes problem −Δu+∇p = f, div u = g in Ω, u∣∂Ω = h is investigated for two‐dimensional exterior domains Ω. By means of potential theory, existence, uniqueness and regularity results for weak solutions are proved in weighted Sobolev spaces with weights proportional to ∣x∣δ as ∣x∣→∞. For f = 0,g = 0, explicit decay formulas are obtained for the solutions u and p. Finally, the results are compared with the theory of r‐generalized solutions, i.e. ∇u∈Lr.

Weak solutions for the exterior Stokes problem in weighted Sobolev spaces

Weak solutions for the exterior Stokes problem in weighted Sobolev spaces

Steady Stokes Flow in Exterior Domains

Exterior Stokes problem in the half-space