Periodic $\mathrm{L}_{p}$ Estimates by ℛ-Boundedness: Applications to the Navier-Stokes Equations

AbstractGeneral evolution equations in Banach spaces are investigated. Based on an operator-valued version of de Leeuw’s transference principle, time-periodic $\mathrm {L}_{p}$ L p estimates of maximal regularity type are carried over from ℛ-bounds of the family of solution operators (ℛ-solvers) to the corresponding resolvent problems. With this method, existence of time-periodic solutions to the Navier-Stokes equations is shown for two configurations: in a periodically moving bounded domain and in an exterior domain, subject to prescribed time-periodic forcing and boundary data.