A maximal regularity estimate for the non-stationary Stokes equation in the strip

Abstract

In a d-dimensional strip with d≥ 2, we study the non-stationary Stokes equation with no-slip boundary condition in the lower and upper plates and periodic boundary condition in the horizontal directions. In this paper we establish a new maximal regularity estimate in the real interpolation norm equation* ||f||(0,1)=∈ff=f0+f1\0<z<1 |f0|+ ∫01 |f1| dz(1-z)z\\,, equation* where the brackets · denotes the horizontal-space and time average. The norms involved in the definition of \|·\|(0,1) are critical for two reasons: the exponents are borderline for the Calder\'on-Zygmund theory and the weight 1/z just fails to be Muckenhoupt. Therefore, the estimate is only true under horizontal bandedness condition, (i. e. a restriction to a packet of wave numbers in Fourier space). The motivation to express the maximal regularity in such a norm comes from an application to the Rayleigh-B\'enard problem.