On Lp-semigroup to Stokes equation with dynamic slip boundary condition in the half-space

Abstract

We consider evolutionary Stokes system, coupled with the so-called dynamic slip boundary condition, in the simple geometry of a d-dimensional half-space. Using the standard technique of the Fourier transform in tangential directions, we obtain an explicit formula for the resolvent. We then deduce estimates for both the weak (i.e. W1,p) and strong (hence W2,p) solutions, which are optimal in terms of the data belonging to appropriate negative Sobolev or fractional Besov space. In the latter case Lp-integrability of the pressure gradient is included. We allow for solutions with non-zero divergence, thus preparing the way for extensions to general domains. As a by-product, we show that the system generates an analytic semigroup in Lp()× Lp(∂ ). Our approach remains elementary in the sense that only the classical Mikhlin multiplier theorem will be used. The methods of H∞-calculus are implicitly present; but we stay away from the concept of R-boundedness and related heavy functional analytic machinery.

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