Location via proxy:   [ UP ]  
[Report a bug]   [Manage cookies]                
Jump to content

Space vector modulation

From Wikipedia, the free encyclopedia

Space vector modulation (SVM) is an algorithm for the control of pulse-width modulation (PWM), invented by Gerhard Pfaff, Alois Weschta, and Albert Wick in 1982.[1][2] It is used for the creation of alternating current (AC) waveforms; most commonly to drive 3 phase AC powered motors at varying speeds from DC using multiple class-D amplifiers. There are variations of SVM that result in different quality and computational requirements. One active area of development is in the reduction of total harmonic distortion (THD) created by the rapid switching inherent to these algorithms.

Principle

[edit]
Topology of a basic three-phase inverter

A three-phase inverter as shown to the right converts a DC supply, via a series of switches, to three output legs which could be connected to a three-phase motor.

The switches must be controlled so that at no time are both switches in the same leg turned on or else the DC supply would be shorted. This requirement may be met by the complementary operation of the switches within a leg. i.e. if A+ is on then A is off and vice versa. This leads to eight possible switching vectors for the inverter, V0 through V7 with six active switching vectors and two zero vectors.

Vector A+ B+ C+ A B C VAB VBC VCA
V0 = {000} OFF OFF OFF ON ON ON 0 0 0 zero vector
V1 = {100} ON OFF OFF OFF ON ON +Vdc 0 −Vdc active vector
V2 = {110} ON ON OFF OFF OFF ON 0 +Vdc −Vdc active vector
V3 = {010} OFF ON OFF ON OFF ON −Vdc +Vdc 0 active vector
V4 = {011} OFF ON ON ON OFF OFF −Vdc 0 +Vdc active vector
V5 = {001} OFF OFF ON ON ON OFF 0 −Vdc +Vdc active vector
V6 = {101} ON OFF ON OFF ON OFF +Vdc −Vdc 0 active vector
V7 = {111} ON ON ON OFF OFF OFF 0 0 0 zero vector

Note that looking down the columns for the active switching vectors V1-6, the output voltages vary as a pulsed sinusoid, with each leg offset by 120 degrees of phase angle.

To implement space vector modulation, a reference signal Vref is sampled with a frequency fs (Ts = 1/fs). The reference signal may be generated from three separate phase references using the transform. The reference vector is then synthesized using a combination of the two adjacent active switching vectors and one or both of the zero vectors. Various strategies of selecting the order of the vectors and which zero vector(s) to use exist. Strategy selection will affect the harmonic content and the switching losses [de].

All eight possible switching vectors for a three-leg inverter using space vector modulation. An example Vref is shown in the first sector. Vref_MAX is the maximum amplitude of Vref before non-linear overmodulation is reached.

More complicated SVM strategies for the unbalanced operation of four-leg three-phase inverters do exist. In these strategies the switching vectors define a 3D shape (a hexagonal prism in coordinates[3] or a dodecahedron in abc coordinates[4]) rather than a 2D hexagon. General SVM techniques are also available for converters with any number of legs and levels.[5]

See also

[edit]

References

[edit]
  1. ^ M.P. Kazmierkowski; R. Krishnan & F. Blaabjerg (2002). Control in Power Electronics: Selected Problems. San Diego: Academic Press. ISBN 978-0-12-402772-5.
  2. ^ Bimal K. Bose (2014). "Engineering and Technology History Wiki: Power electronics". Retrieved 29 Dec 2023.
  3. ^ R. Zhang, V. Himamshu Prasad, D. Boroyevich and F.C. Lee, "Three-Dimensional Space Vector Modulation for Four-Leg Voltage-Source Converters," IEEE Power Electronics Letters, vol. 17, no. 3, May 2002
  4. ^ M.A. Perales, M.M. Prats, R.Portillo, J.L. Mora, J.I. León, and L.G. Franquelo, "Three-Dimensional Space Vector Modulation in abc Coordinates for Four-Leg Voltage Source Converters," IEEE Power Electronics Letters, vol. 1, no. 4, December 2003
  5. ^ Ó. Lopez, J. Alvarez, J. Doval-Gandoy and F. D. Freijedo, "Multilevel Multiphase Space Vector PWM Algorithm," in IEEE Transactions on Industrial Electronics, vol. 55, no. 5, pp. 1933-1942, May 2008.