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Extension of the Cochrun-Grabel method to allow for mutual inductances

Andreani, Pietro LU and Mattisson, Sven LU (1999) In IEEE Transactions on Circuits and Systems Part 1: Fundamental Theory and Applications 46(4). p.481-483
Abstract
The Cochrun-Grabel (C-G) method, an algorithm for finding the characteristic polynomial of a circuit containing reactances, has so far been restricted to circuits not employing mutual inductances. In this paper we present an intuitive, yet rigorous, proof of the Cochrun-Grabel method for a general RLC circuit, and we extend the method to allow the analysis of an RLC circuit containing mutual inductances
Please use this url to cite or link to this publication:
author
organization
publishing date
type
Contribution to journal
publication status
published
subject
in
IEEE Transactions on Circuits and Systems Part 1: Fundamental Theory and Applications
volume
46
issue
4
pages
481 - 483
publisher
IEEE--Institute of Electrical and Electronics Engineers Inc.
external identifiers
  • Scopus:0033279440
ISSN
1057-7122
DOI
10.1109/81.754848
language
English
LU publication?
yes
id
0aecacb1-4040-41fc-b1b9-a2fbc705b9d8 (old id 1050720)
alternative location
http://ieeexplore.ieee.org/iel4/81/16301/00754848.pdf
date added to LUP
2008-03-27 14:06:31
date last changed
2016-10-13 04:23:38
@misc{0aecacb1-4040-41fc-b1b9-a2fbc705b9d8,
  abstract     = {The Cochrun-Grabel (C-G) method, an algorithm for finding the characteristic polynomial of a circuit containing reactances, has so far been restricted to circuits not employing mutual inductances. In this paper we present an intuitive, yet rigorous, proof of the Cochrun-Grabel method for a general RLC circuit, and we extend the method to allow the analysis of an RLC circuit containing mutual inductances},
  author       = {Andreani, Pietro and Mattisson, Sven},
  issn         = {1057-7122},
  language     = {eng},
  number       = {4},
  pages        = {481--483},
  publisher    = {ARRAY(0x762eb48)},
  series       = {IEEE Transactions on Circuits and Systems Part 1: Fundamental Theory and Applications},
  title        = {Extension of the Cochrun-Grabel method to allow for mutual inductances},
  url          = {http://dx.doi.org/10.1109/81.754848},
  volume       = {46},
  year         = {1999},
}