×

Efficient dynamic models for induction machines. (English) Zbl 0957.78503


MSC:

78A55 Technical applications of optics and electromagnetic theory
78M20 Finite difference methods applied to problems in optics and electromagnetic theory
PDFBibTeX XMLCite
Full Text: DOI

References:

[1] The Nature of Induction Machines, Gordon and Breach, London, 1965.
[2] Williamson, IEE Proc B 12 pp 93– (1982)
[3] and , Finite Elements for Electrical Engineers, Cambridge University Press, Cambridge, 1983. · Zbl 0587.73157
[4] Williamson, IEE Proc. B 130 pp 18– (1983)
[5] Demenko, IEEE Trans. Magn. 30 pp 3264– (1994)
[6] Carpenter, Proc. IEEE 115 pp 1505– (1968)
[7] and , ’Reluctance mesh modelling of induction motors with healthy and faulty rotors’, in 31st IEEE Industrial Applications Society Conf., San Diego, Oct. 6-10, 1996, pp. 625-632.
[8] ’Modelling of rotor defects in squirrel cage induction motors using the time stepping numerical field analysis’, PhD thesis, The University of Nottingham, 1995.
[9] Ostović, IEEE Trans. Energy Conv. EC-1 pp 190– (1986)
[10] Demenko, IEEE Trans. Magn. 28 pp 1406– (1992)
[11] Williamson, IEEE Trans. Magn. 21 pp 2396– (1985)
[12] Salon, IEEE Trans. Magn. 30 pp 3697– (1994)
[13] Vinsard, IEEE Trans. Magn. 30 pp 3693– (1994)
[14] McClay, IEE Proc. Electr. Power Appl. 145 pp 414– (1998)
[15] Mizia, IEEE Trans. Magn. 22 pp 447– (1988)
[16] Iterative Methods for Sparse Linear Systems, PWS, Boston, 1996.
This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. In some cases that data have been complemented/enhanced by data from zbMATH Open. This attempts to reflect the references listed in the original paper as accurately as possible without claiming completeness or a perfect matching.