On the construction and numerical solution of transmission-line and lumped network models of Maxwell's equations

We consider two basic potential theoretic problems in Riemannian manifolds: Hodge decompositions and Maxwell's equations. Here we are concerned with smoothness and integrability assumptions. In the context of L p forms in Lipschitz domains, we show that both are well posed provided that 2 -e < p < 2

## Abstract This paper is concerned with the structure of the singular and regular parts of the solution of time‐harmonic Maxwell's equations in polygonal plane domains and their effective numerical treatment. The asymptotic behaviour of the solution near corner points of the domain is studied by m

A widely used approach for the computation of time-harmonic electromagnetic ÿelds is based on the wellknown double-curl equation for either E or H, where edge elements are an appealing choice for ÿnite element discretizations. Yet, the nullspace of the curl-operator comprises a considerable part of

## Abstract A stub leakage resistor at the nodes of an otherwise lossless TLM chain (i.e. without series resistors) introduces losses, although the corresponding absorption term in the Telegraphers' equation vanishes due to the absence of series resistors. This contradiction is outlined, an explana