TY - JOUR

T1 - Winding Function Approach for Winding Analysis

AU - Raziee, Seyed Morteza

AU - Misir, Onur

AU - Ponick, Bernd

N1 - Funding Information: ACKNOWLEDGMENT This work was supported in part by Niedersächsisches Ministerium für Wissenschaft und Kultur and in part by Leibniz Universität Hannover, especially the Institute for Drive Systems and Power Electronics. Publisher Copyright: © 1965-2012 IEEE. Copyright: Copyright 2017 Elsevier B.V., All rights reserved.

PY - 2017/10

Y1 - 2017/10

N2 - The winding factor is an operand in order to consider the effect of winding distribution and chording on the spatial distribution of the magnetic field in the air gap of synchronous and induction machines. The sinusoidal functions for winding factor calculation presented in literature are not defined and valid for every irregular winding, e.g., single-layer fractional-slot, combined star-delta, multilayer (greater than two), and asymmetrical windings. Although the summation of induced voltage phasors (star of slots) is the most accurate method, asymmetrical windings require to be decomposed in symmetrical components. In this paper, in addition to deriving the symmetrical components for asymmetrical multiphase windings, the analytical formulation is presented to relate the harmonic content of winding functions to winding factors. The harmonic leakage factor is accurately formulated from the winding function instead of the Görges diagram without the need for summing up an infinite number of normalized winding factors quadratically. Without restriction of the number of layers and the distribution of the winding, including full-pitch, chorded and fractional-slot symmetrical and asymmetrical windings, the suggested analysis method is validated with the star of slots and sinusoidal functions of distribution and pitch factors, where applicable.

AB - The winding factor is an operand in order to consider the effect of winding distribution and chording on the spatial distribution of the magnetic field in the air gap of synchronous and induction machines. The sinusoidal functions for winding factor calculation presented in literature are not defined and valid for every irregular winding, e.g., single-layer fractional-slot, combined star-delta, multilayer (greater than two), and asymmetrical windings. Although the summation of induced voltage phasors (star of slots) is the most accurate method, asymmetrical windings require to be decomposed in symmetrical components. In this paper, in addition to deriving the symmetrical components for asymmetrical multiphase windings, the analytical formulation is presented to relate the harmonic content of winding functions to winding factors. The harmonic leakage factor is accurately formulated from the winding function instead of the Görges diagram without the need for summing up an infinite number of normalized winding factors quadratically. Without restriction of the number of layers and the distribution of the winding, including full-pitch, chorded and fractional-slot symmetrical and asymmetrical windings, the suggested analysis method is validated with the star of slots and sinusoidal functions of distribution and pitch factors, where applicable.

KW - Electromotive force (EMF)

KW - fast Fourier transform (FFT)

KW - fractional-slot concentrated winding (FSCW)

KW - fractional-slot distributed winding (FSDW)

KW - Görges diagram

KW - harmonic leakage factor

KW - magnetomotive force (MMF)

KW - symmetrical components

KW - winding factor for all spatial harmonics

KW - winding function approach

UR - http://www.scopus.com/inward/record.url?scp=85029939780&partnerID=8YFLogxK

U2 - 10.1109/tmag.2017.2712570

DO - 10.1109/tmag.2017.2712570

M3 - Article

AN - SCOPUS:85029939780

VL - 53

JO - IEEE Transactions on Magnetics

JF - IEEE Transactions on Magnetics

SN - 0018-9464

IS - 10

M1 - 7940031

ER -