Convergence theory for two-level hybrid Schwarz preconditioners for high-frequency Helmholtz problems

We give a novel convergence theory for two-level hybrid Schwarz domain-decomposition (DD) methods for finite-element discretisations of the high-frequency Helmholtz equation. This theory gives sufficient conditions for the preconditioned matrix to be close to the identity, and covers DD subdomains of arbitrary size, and arbitrary absorbing layers/boundary conditions on both the global and local Helmholtz problems. The assumptions on the coarse space are satisfied by the approximation spaces using problem-adapted basis functions that have been recently analysed as coarse spaces for the Helmholtz equation, as well as all spaces that are known to be quasi-optimal via a Schatz-type argument. As an example, we apply this theory when the coarse space consists of piecewise polynomials; these are then the first rigorous convergence results about a two-level Schwarz preconditioner applied to the high-frequency Helmholtz equation with a coarse space that does not consist of problem-adapted basis functions.