# Copper-squirrel-cage solid rotor teeth zone parameter rational choice for induction motor operating under geophysical conditions/Geofizinemis salygomis dirbanciu asinchroniniu varikliu su vientisuoju narveliniu rotoriumi dantu zonos racionaliu parametru parinkimas.

IntroductionBorehole investigation devices are used for different parameter rock solid, boring coordinate and other measurements, as well as for oil, gas, minerals exploration and the storage of knowledge about the composition of earth crust, eruptive phenomena and the history of organic life on earth. The small-power motors can be used in acoustic TV sets and cameras to register underground bag or borehole profile and for similar purposes.

Operation conditions of borehole investigation device electric motors are such as: wide temperature change interval reaching from -20[degrees]C up to +200[degrees]C; hydrostatic pressure--from atmospheric up to 150 MPa and more; operation medium-dielectric liquid; limited power supply source; long geophysical cable up to (5000-8000) m; non-constant motor load during the operating cycle and at different cycles, non-constant voltage of the motor power source--affect reliable operation of the motor, transmission of maximum electric power to the motor and changes of motor characteristics.

The effects of the number of rotor slots and rotor slit depth on the performance characteristics of cage solid rotor [1] and slitted solid rotor [2, 3] induction motors are analyzed. The improvement of the copper-squirrel-cage solid rotor parameters can be achieved choosing the number of teeth and optimizing rotor teeth geometry [4]. The optimizing criterions have been proposed: minimum value of the magnetizing current; minimum value of the magnetizing reactance.

So, it is necessary to investigate the optimization of copper-squirrel-cage solid rotor geometry taking into account the parameters of the supply circuit and the motor equivalent circuit.

On the other hand, in case of the motor diameter decrease, the solid rotor active resistance increases and if it is designed for the operation with smaller supply circuit resistance, it will be impossible to match the resistances of supply circuit and the motor.

In this study the most powerful motors operating in the boreholes, such as electric drills and submerged pumps, the power of which reaches ten and hundred kilowatts, are not analyzed. Since the problem discussed in this study is closely related to those motors, some conclusions could be useful designing and maintaining the latter.

Proposed Algorithm

The rotors teeth number choice of conventional induction motors taking into account the number of stator teeth, the number of pole pairs and the influence of higher harmonics on motor characteristics are presented in many of books on electrical machines. Of course, the slitted solid rotor induction motor must have the certain number of teeth and optimal width and height [2]. In case of copper-squirrel-cage solid rotor the rational teeth zone geometric dimensions and the number of teeth also plays an important role in order to match the borehole motor and supply circuit parameters.

The calculation resistances and leakage reactances of the rotor teeth and yoke are carried out using the iteration method: for the teeth according to the teeth magnetic permeability change, depending on the effective magnetic field intensity of teeth and for the yoke according to the yoke magnetic permeability change, depending on the rotor yoke linear load.

Since the rotor copper bars are inserted into slots the rectangular shape is rational from the technological point of view if the slots would be milled skew. In this case the tooth width will be used as average value:

[b.sub.z.a] = [b.sub.z] + [b.sub.zy]/2; (1)

here [b.sub.z] = [t.sub.z] - [b.sub.g]; [b.sub.zy] = [t.sub.zy] - [b.sub.g]; [b.sub.z] is the tooth width at rotor outer diameter surface; [b.sub.zy] is the tooth width at rotor yoke diameter surface; [b.sub.g] is the rotor slot width.

The resistance of copper-squirrel-cage solid rotor can be reduced if the teeth zone geometry will be rationally chosen. Solely the decreasing of the changing rotor bar cross-section is not rational. The copper-squirrel-cage solid rotor complex impedance referred to the stator is expressed as [5]:

[MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] (2)

here

[[Z'.bar].sub.2Z](s) = [R'.sub.sZ](s) + j[X'.sub.2Z](s); [[Z'.bar].sub.2Z](s) = [R'.sub.2Y](s) + j[X'.sub.2Y](s).

The resistance of copper-squirrel-cage solid rotor when s=1:

[R'.sub.2[SIGMA]](1) = [Y'.sub.2r]/[([Y'.sub.2r]).sup.2] + [([Y'.sub.2x]).sup.2]; (3)

here

[MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII]

The copper-squirrel-cage solid rotor teeth zone optimization criterion is accepted as

[MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] (4)

with the limitations [X'.sub.2[SIGMA]](1) = [X'.sub.2[SIGMA]min](1) < [R'.sub.2[SIGMA]](1), [B.sub.Z max] < [[B.sub.Z]]. Here [[B.sub.Z]] is the limited value of the rotor tooth magnetic flux density; [[Z.bar].sub.C] is the complex impedance of the supply circuit.

The change of the rotor tooth geometric dimensions in any way must be limited by maximum value of the magnetic flux density

[B.sub.Z max] = [B.sub.[delta]] [t.sub.z][l.sub.S]/[b.sub.z.min] [l.sub.R]; (5)

here [l.sub.S], [l.sub.R] is the stator, rotor active lengths.

According to the magnetic circuit calculations of these motors, it can be accepted that: [[B.sub.Z]] = (1.7 / 1.9) T; [B.sub.[delta]] = (0.5 / 0.55) T; [B.sub.j2max] = (1.3 / 1.5) T; (here [B.sub.j2max] is the maximum value of the rotor yoke magnetic flux density). The parameters [[Z.bar].sub.1], [[Z.bar].sub.m], [[Z'.bar].sub.2Cu] are calculated according to traditional methods. The individual stages of the motor optimization (geometric dimension of magnetic circuit, winding data, and synthesis of equivalent parameters) are done according to methods presented in [6]. The calculation algorithm of copper-cage solid rotor tooth zone parameters is presented in Fig. 1. The rotor tooth width is changed by adequate pitch when the height is constant and vice versa. The slot (tooth) height is chosen taking into account the limited value of rotor yoke computable magnetic flux density.

[FIGURE 1 OMITTED]

Results and discussion

The basic geometrical dimensions of the studied two-phase and two-pole motor: outer diameter--36 mm (outer diameter of the stator core is also the outer diameter of the motor), active length of the stator and also of the rotor--50 mm, inner diameter of the stator core--17 mm, air gap--0.2 mm. The number of stator slots--8, the stator winding is double-layer former short-pitch, the number of phase turns--[w.sub.1] = 1100, the number of the rotor slots was varied from 12 to 20. The same stator was used in all optimization calculations in order to achieve comparable results.

The investigations with a slitted solid rotors show the choice of teeth geometry influenced by solid rotor parameters [2, 3]. The copper-squirrel-cage rotor parameters analyzed in the study are the number, the depth and width of the slots and the geometry of end rings through which the maximum electromagnetic torque is achieved. In this case the rotor resistance rather decreases and leakage reactance also decreases.

[FIGURE 2 OMITTED]

[FIGURE 3 OMITTED]

The ratio of the resistance and leakage reactance of the rotor changes to the side of increasing reactance.

Usually the air gap in an induction motor is chosen to be smaller in order to keep magnetizing current at minimum. On the other hand, if the stator of small-power motor has only eight slots the higher spatial harmonics (seventh and ninth) are of the first order slot harmonics. For this reason, the air gap reduces the leakage reactance but also reduces the magnetizing reactance.

Theoretically the combination stator-rotor slots for the small-power two-pole squirrel-cage induction motors with eight stator slots (the number of slots per pole per phase is 2) is no suitable as it is recommended in books on electrical machines.

The odd rotor slot number in case of two-pole induction motor leads to a distortion of the magnetic flux distribution and is the reason for the unbalanced magnetic pull.

The optimization calculations are carried out at symmetrical supply-source voltage 260 V and media temperature (the resistance of the supply circuit is 200 [OMEGA]) +150 [degrees]C. The best value of average electromagnetic torque (or power) as a function of rotor slot (tooth) depth (Fig. 4.) and as a function of rotor slot width (Fig. 3.) can be considered the main factor for choosing the rational rotor teeth zone geometrical dimensions.

The calculations at medium temperature +20[degrees]C (the resistance of the supply circuit is 165 [OMEGA]) shows that the leakage reactance of cage winding practically changes negligibly, while the resistances of rotor teeth and yoke decrease to (42-44) % and appropriately the leakage reactances decrease to (13-16) %.

In order to the optimization criterion will approach to minimum the most influence has the copper-cage winding resistance [R'.sub.2Cu] because it is 3-4 times smaller than the rotor teeth resistance [R'.sub.2Z] and up to 10 times smaller than the rotor yoke resistance [R'.sub.2Y].

[FIGURE 4 OMITTED]

It is important to remark that the rational rotor teeth zone geometrical dimensions can be chosen when the motor operates at the worst conditions (maximum medium temperature and concrete supply circuit) while it operates at less medium temperatures the optimization criterion (4) is not fully satisfied ([R'.sub.2[SIGMA]] (1, [b.sub.g] ([T.sub.em.a.max])) [approximately equal to] [R.sub.C]) but the created electromagnetic torque of the motor is larger. At least the change of rotor teeth number influences the distortion of squirrel-cage solid rotor resistances and reactance while the average electromagnetic torque is practically the same.

Conclusions

The algorithm for the teeth zone geometrical dimensions optimization of the copper-squirrel-cage solid rotor induction motor, used in the borehole investigation devices, is created.

As the optimization criterion, the comparison of the rotor equivalent resistance with the supply circuit resistance is accepted. The maximum value of average electromagnetic torque is considered as the main factor.

The choice of an even number rotor teeth is recommended taking into account the limitations of the optimization criterion and the possible influence of higher spatial harmonics and technologically minimum tooth width at rotor yoke diameter surface. The difference on the average electromagnetic torque is considerably small as the number of rotor slots is 14 or 18.

Received 2008 10 09

References

[1.] Valtonen M., Parviainen A., Pyrhonen J. The Effects of the Number of Rotor Slots on the Performance Characteristics of Axial-Flux Aluminium-Cage Solid-Rotor Core Induction Motor // IEEE International Conference on Electric Machines & Drives IEMDC '07.--2007.--Vol. 1.--P. 668-672.

[2.] Aho T., Nerg J., Pyrhonen J. The Effect of the Number of Rotor Slits on the Performance Characteristics of Medium-Speed Solid Rotor Induction Motor // The 3rd IET International Conference on Power Electronics, Machines and Drives.--2006.--P. 515-519.

[3.] Aho T., Nerg J., Sopanen J., Huppunen J., Pyrhonen J. Analyzing the Effect of the Rotor Slit Depth on the Electric and Mechanical Perfomance of a Solid-Rotor Induction Motor // International Review of Electrical Engineering (IREE).--2006.--Vol. 1, No. 4.--P. 516-525.

[4.] [TEXT NOT REPRODUCIBLE IN ASCII] 1984.--166 c

[5.] Gecys S., Smolskas P., Zmuida M. Induction Motor with Solid Ferromagnetic Cage Winding Rotor for Borehole Investigating Devices // Proceedings of the XVII International Conference on Electromagnetic Disturbances EMD'2007.--Kaunas: Technologija, 2007.--P. 53-56.

[6.] [TEXT NOT REPRODUCIBLE IN ASCII] 2002.--512 c.

S. Gecys, P. Smolskas

Department of Electric Power Systems, Kaunas University of Technology, Studentu str. 48, LT-51367 Kaunas, Lithuania; phone: + 370 37 300277, e-mail: pranas.smolskas@ktu.lt

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Title Annotation: | ELECTRICAL ENGINEERING/ELEKTROS INZINERIJA |
---|---|

Author: | Gecys, S.; Smolskas, P. |

Publication: | Elektronika ir Elektrotechnika |

Article Type: | Report |

Geographic Code: | 4EXLT |

Date: | Jan 1, 2009 |

Words: | 1911 |

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