On the large time L∞-estimates of the Stokes semigroup in two-dimensional exterior domains

Abstract

We prove that the Stokes semigroup is a bounded analytic semigroup on L∞σ of angle π/2 for two-dimensional exterior domains. This result is an end point case of the Lp-boundedness of the semigroup for p∈ (1,∞), established by Borchers and Varnhorn (1993) and an extension of finite time L∞-estimates studied by the author and Giga (2014). The proof is based on the non-existence result of bounded steady flows (the Stokes paradox) and some asymptotic formula for the net force of the Stokes resolvent.