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

Pietro Andreani; Sven Mattisson

doi:10.1109/81.754848

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

Pietro Andreani, Sven Mattisson

Department of Electrical and Information Technology

Research output: Contribution to journal › Article › peer-review

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

Original language	English
Pages (from-to)	481-483
Journal	IEEE Transactions on Circuits and Systems Part 1: Fundamental Theory and Applications
Volume	46
Issue number	4
DOIs	https://doi.org/10.1109/81.754848
Publication status	Published - 1999

Subject classification (UKÄ)

Electrical Engineering, Electronic Engineering, Information Engineering

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10.1109/81.754848

http://ieeexplore.ieee.org/iel4/81/16301/00754848.pdf

Cite this

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title = "Extension of the Cochrun-Grabel method to allow for mutual inductances",

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",

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AU - Mattisson, Sven

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AB - 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

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DO - 10.1109/81.754848

M3 - Article

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JO - IEEE Transactions on Circuits and Systems Part 1: Fundamental Theory and Applications

JF - IEEE Transactions on Circuits and Systems Part 1: Fundamental Theory and Applications

IS - 4

ER -

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

Abstract

Subject classification (UKÄ)

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