H∞-calculus for the Stokes operator with Hodge, Navier, and Robin boundary conditions on unbounded domains
Abstract
We study the Stokes operator with Hodge, Navier, and Robin boundary conditions on domains ⊂eqRd that are uniformly C2,1. Starting with the Hodge Laplacian we etablish a bounded H\"ormander functional calculus for the Stokes operator with Hodge boundary conditions. This entails a H\"ormander functional calculus and boundedness of the H∞-calculus in spaces of soleniodal vector fields for the Stokes operator with Hodge boundary conditions. We then establish boundedness of the H∞-calculus for Stokes operators with Navier type conditions via Robin type perturbations of Hodge boundary conditions. This implies maximal Lp-regularity for these operators and results on fractional domain spaces. Our results cover certain non-Helmholtz domains.
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