Publication detail

Pulsed EM Field Computation in Planar Circuits: The Contour Integral Method

ŠTUMPF, M.

Original Title

Pulsed EM Field Computation in Planar Circuits: The Contour Integral Method

English Title

Pulsed EM Field Computation in Planar Circuits: The Contour Integral Method

Type

book

Language

en

Original Abstract

The pulsed EM characterization of planar circuits is of high practical importance in many areas of science and engineering such as electromagnetic compatibility and antenna design. This book is hence devoted to the mathematical formulation and numerical analysis of arbitrarily-shaped parallel-plane structures concerning their pulsed EM propagation, radiation and scattering behavior.

English abstract

The pulsed EM characterization of planar circuits is of high practical importance in many areas of science and engineering such as electromagnetic compatibility and antenna design. This book is hence devoted to the mathematical formulation and numerical analysis of arbitrarily-shaped parallel-plane structures concerning their pulsed EM propagation, radiation and scattering behavior.

Keywords

planar circuit; contour integral method; time domain

Released

12.06.2018

Publisher

CRC Press

Location

Boca Raton, FL, USA

ISBN

9781138735248

Book

Pulsed EM Field Computation in Planar Circuits: The Contour Integral Method

Edition number

1

Pages count

244

URL

BibTex


@book{BUT148300,
  author="Martin {Štumpf}",
  title="Pulsed EM Field Computation in Planar Circuits: The Contour Integral Method",
  annote="The pulsed EM characterization of planar circuits is of high practical importance in many areas of science and engineering such as electromagnetic compatibility and antenna design. This book is hence devoted to the mathematical formulation and numerical analysis of arbitrarily-shaped parallel-plane structures concerning their pulsed EM propagation, radiation and scattering behavior.",
  address="CRC Press",
  booktitle="Pulsed EM Field Computation in Planar Circuits: The Contour Integral Method",
  chapter="148300",
  howpublished="print",
  institution="CRC Press",
  year="2018",
  month="june",
  publisher="CRC Press",
  type="book"
}