Detail publikace

Cagniard-DeHoop Technique-Based Computation of Retarded Partial Coefficients: The Coplanar Case

ŠTUMPF, M. ANTONINI, G. RUEHLI, A. E.

Originální název

Cagniard-DeHoop Technique-Based Computation of Retarded Partial Coefficients: The Coplanar Case

Anglický název

Cagniard-DeHoop Technique-Based Computation of Retarded Partial Coefficients: The Coplanar Case

Jazyk

en

Originální abstrakt

Efficient computation of partial elements plays a key role in the Partial Element Equivalent Circuit (PEEC) method. A novel analytical method for computing retarded partial coefficients based on the Cagniard-DeHoop (CdH) technique is proposed. The methodology is first theoretically developed and then illustrated on the computation of a surface retarded partial coefficient pertaining to two coplanar rectangular surface elements. An efficient way for incorporating loss mechanisms in the time domain (TD) via the Schouten-Van der Pol theorem is proposed. Illustrative numerical examples demonstrating the validity of the introduced solution are given.

Anglický abstrakt

Efficient computation of partial elements plays a key role in the Partial Element Equivalent Circuit (PEEC) method. A novel analytical method for computing retarded partial coefficients based on the Cagniard-DeHoop (CdH) technique is proposed. The methodology is first theoretically developed and then illustrated on the computation of a surface retarded partial coefficient pertaining to two coplanar rectangular surface elements. An efficient way for incorporating loss mechanisms in the time domain (TD) via the Schouten-Van der Pol theorem is proposed. Illustrative numerical examples demonstrating the validity of the introduced solution are given.

Dokumenty

BibTex


@article{BUT165312,
  author="Martin {Štumpf}",
  title="Cagniard-DeHoop Technique-Based Computation of Retarded Partial Coefficients: The Coplanar Case",
  annote="Efficient computation of partial elements plays a key role in the Partial Element Equivalent Circuit (PEEC) method. A novel analytical method for computing retarded partial coefficients based on the Cagniard-DeHoop (CdH) technique is proposed. The methodology is first theoretically developed and then illustrated on the computation of a surface retarded partial coefficient pertaining to two coplanar rectangular surface elements. An efficient way for incorporating loss mechanisms in the time domain (TD) via the Schouten-Van der Pol theorem is proposed. Illustrative numerical examples demonstrating the validity of the introduced solution are given.",
  address="IEEE",
  chapter="165312",
  doi="10.1109/ACCESS.2020.3016316",
  howpublished="online",
  institution="IEEE",
  number="1",
  volume="8",
  year="2020",
  month="august",
  pages="148989--148996",
  publisher="IEEE",
  type="journal article in Web of Science"
}