English

Differential Forms and Boundary Integral Equations for Maxwell-Type Problems

Numerical Analysis 2014-11-18 v2

Abstract

We present boundary-integral equations for Maxwell-type problems in a differential-form setting. Maxwell-type problems are governed by the differential equation (δdk2)ω=0(\delta\mathrm{d}-k^2)\omega = 0, where kCk\in\mathbb{C} holds, subject to some restrictions. This problem class generalizes curlcurl\textbf{curl}\,\textbf{curl}- and divgrad\mathrm{div}\,\textbf{grad}-types of problems in three dimensions. The goal of the paper is threefold: 1) Establish the Sobolev-space framework in the full generality of differential-form calculus on a smooth manifold of arbitrary dimension and with Lipschitz boundary. 2) Introduce integral transformations and fundamental solutions, and derive a representation formula for Maxwell-type problems. 3) Leverage the power of differential-form calculus to gain insight into properties and inherent symmetries of boundary-integral equations of Maxwell-type.

Keywords

Cite

@article{arxiv.1411.2661,
  title  = {Differential Forms and Boundary Integral Equations for Maxwell-Type Problems},
  author = {Stefan Kurz and Bernhard Auchmann},
  journal= {arXiv preprint arXiv:1411.2661},
  year   = {2014}
}

Comments

69 pages

R2 v1 2026-06-22T06:54:12.115Z