Uniform estimates for Stokes equations in a domain with a small hole and applications in homogenization problems

Abstract

We consider the Dirichlet problem of the Stokes equations in a domain with a shrinking hole in Rd, \ d≥ 2. A typical observation is that, the Lipschitz norm of the domain goes to infinity as the size of the hole goes to zero. Thus, if p≠ 2, the classical results indicate that the W1,p estimate of the solution may go to infinity as the size of the hole tends to zero. In this paper, we give a complete description for the uniform W1,p estimates of the solution for all 1<p<∞. We show that the uniform W1,p estimate holds if and only if d'<p<d (p=2 when d=2). We then give two applications in the study of homogenization problems in fluid mechanics: a generalization of the restriction operator and a construction of Bogovskii type operator in perforated domains with a quantitative estimate of the operator norm.