A Stabilized Domain Decomposition Method with Nonmatching Grids for the Stokes Problem in Three Dimensions

We present and study a nonconforming domain decomposition method for the discretization of the three-dimensional Stokes problem in the velocity-pressure formulation. The approximation is based on some local mixed finite elements for nonmatching tetrahedral grids. The aim pursued is a systematic construction of the mortared discrete velocity space, the pressure being not subjected to any matching constraints across the interfaces. Using the bubble stabilization techniques, applied in Brezzi and Marini's paper to the three fields method [Math. Comp., 70 (2001), pp. 911--934], allows us to define an algorithm which is easy to implement. The numerical analysis relies on the pressure-splitting argument of Boland and Nicolaides and allows us to establish an inf-sup condition with a constant that does not depend on the mesh size or on the total number of the subdomains. Then, by the Berger--Scott--Strang lemma written down for our saddle point system we derive optimal accuracy results.