Iterative leap-field domain decomposition method: A domain decomposition finite element algorithm for 3D electromagnetic boundary value problems

## Abstract This Letter, proposes an algebraic domain decomposition algorithm (ADDA) to solve large sparse linear systems derived from the vector finite‐element method (FEM) for 3D electromagnetic field problems. The proposed method segments the problem into several smaller pieces, solves each subp

this paper, we present a domain decomposition method, based on the general theory of Steklov-Poincare operators, for a class of linear exterior boundary value problems arising in potential theory and heat conductivity. We first use a Dirichlet-to-Neumann mapping, derived from boundary integral equat

A non-overlapping domain decomposition method with adaptive interface conditions is applied to parabolic initial-boundary value problems in the full range from diffusion-to advection-dominated problems. The basic discretizations are the discontinuous Galerkin method in time and a stabilized Galerkin