An optimization-based domain decomposition method for a nonlinear problem

An optimization-based domain decomposition method for the solution of partial differential equations is presented. The crux of the method is a constrained minimization problem for which the objective functional measures the jump in the dependent variables across the common boundaries between subdoma

A nonoverlapping domain decomposition method for optimization problems for partial differential equations is presented. The domain decomposition is effected through an auxiliary optimization problem. This results in an multiobjective optimization problem involving the given functional and the auxili

This work deals with the efficient numerical solution of nonlinear parabolic problems posed on a two-dimensional domain Ω. We consider a suitable decomposition of domain Ω and we construct a subordinate smooth partition of unity that we use to rewrite the original equation. Then, the combination of

## Abstract An absorbing fictitious boundary condition (FBC) is presented to generate an iterative domain decomposition method (DDM) for analyzing waveguide problems. The FBC for connecting the subdomains on a fictitious boundary is developed according to the actual field distribution in the wavegu