On the R-boundedness of solution operator families for two-phase Stokes resolvent equations

Abstract

The aim of this paper is to show the existence of R-bounded solution operator families for two-phase Stokes resolvent equations in =+-, where are uniform Wr2-1/r domains of N-dimensional Euclidean space RN (N≥ 2, N<r<∞). More precisely, given a uniform Wr2-1/r domain with two boundaries satisfying +-=, we suppose that some hypersurface divides into two sub-domains, that is, there exist domains ⊂ such that +-= and =+-, where +=, -=, and the boundaries of consist of two parts and , respectively. The domains are filled with viscous, incompressible, and immiscible fluids with density and viscosity μ, respectively. Here are positive constants, while μ=μ(x) are functions of x∈RN. On the boundaries , +, and -, we consider an interface condition, a free boundary condition, and the Dirichlet boundary condition, respectively. We also show, by using the R-bounded solution operator families, some maximal Lp-Lq regularity as well as generation of analytic semigroup for a time-dependent problem associated with the two-phase Stokes resolvent equations. This kind of problems arises in the mathematical study of the motion of two viscous, incompressible, and immiscible fluids with free surfaces.