V- Characteristic Formulas of Voltage Limiting Type SPD Their pplications N.F Zhang #, J.Shu *, M.H.Wang #3 # Changzhou Chuang-Jie Lightning Pretection Co., Ltd. P.O.ox.303. Changzhou,Jiangsu,China. znf40@63.com bstract The V- characteristic formulas which are applicable to the SPD with ZnO varistor as its non-linear element are presented. The formulas describe the relationship between residual voltage surge current of an SPD, have distinct advantages as compared with previous formulas that their deviations from correctly measured values of voltage current are generally not more than 3% over a current range of more than two decades. The methods steps for determining the formulas via testing calculations are also presented in this paper, at last an example is given to show how to resolve related problems by use of the V- characteristic formulas.. NTODCTON n terms of the related specifications of SPD, an SPD is a device that contains at least one nonlinear component that is intended to limit surge voltages divert surge currents. Therefore the relation of residual voltage versus surge current is a most important application characteristic over a specified current range, which is, typically from 0.05 n to.0 n ( n refers to the nominal discharge current of SPD). Generally the limiting voltage of an SPD ( SPD ) at a given surge current ( P ) is a sum of the voltage across the nonlinear component ( ) herein is varistor(s) a structural voltage drop ( x ): SPD = + x () The x includes all voltage drops along the current path inside the SPD but for the voltage drop on the, varistor(s), the main inner parts are a thermal lin, two connection terminals, conductors between the varistor(s) terminals. s for a typical module type SPD, x corresponds to a voltage drop of a resistor x <mωwhich is about (~)% of the SPD. Therefore the V- characteristic formula of the varistor(s) used in SPD can be approximately considered as the formula of the SPD ( SPD ). f more accuracy is needed, then the structural voltage drop has to be added ( SPD = + x ). ecause testing for x is easy to do, therefore the next discussions of this paper will focus on the V- characteristic formulas of the varistors used in the SPD. s for most applications of the SPDs, their V- characteristic formula should satisfy the three-requirements as below:) t covers a pea current range not less than two decades ) The deviations of the formula values from the correctly measured values of voltage current of SPD or varistor samples are not more than 3%,or at most 5%. 3) The test calculation steps for determination of the formulas should be easy to do. t may be helpful to review briefly the history of varistor s V- characteristic formulas. Due to the conduction mechanisms of a varistor being quite complex, up to now there is no a theoretical V- formula which is appropriate to ZnO varistor. t the discovery of ZnO varistors in 968, only an empirical equation () was given [] V ( ) () C Where: V is the voltage on the varistor as a current passing through it; C α are constants which depend on individual varistor, theαwas termed as non-linear voltage exponent (index) that is greater than.0. The equation () was rewritten as equation (3) or equation (4) in the EC spec. []. C (3) (4) Where: is the voltage on the varistor as a current passing thru it; C, β, γ(γ=/β) are constants which depend on the individual varistor. t should be noted that theγin equation (4) is identical to the α in equation (). nfortunately the above V- equations serve no useful purpose for engineering calculations due to their applicable only to a very narrow current range in which theαvalue is considered as a constant, but in fact theαvalue of a varistor varies significantly with the current variation, figure gave an example. t is seen from the curve of α versus log that at 00 (log.3) α 6 while at 8000 (log 3.9) α 8 (α refers to an αvalue over a current range [, ] ) Some years later another V- formula (5) was proposed [3,4] that was derived from an equivalent circuit for varistor, in terms of which a varistor may be considered as a non-linear resistor ( C ) connected in series with a linear resistor ( X ), as showed by equation (5). ( C x ) C x (5) This formula do satisfied the requirement of a current range not less than two decades, but its deviation was unsatisfied to engineering calculations.
three-requirements, while the fitting equations obtained from fit(log ) to (Log ) or fit (log ) to (Log ) have a deviations of beyond 5%. t is stressed that our idea of fitting (log ) to (Log ) came from our new understing of varistor that a varistor is more current dependent than voltage dependent, while Fig..3 provided another evidence for this viewpoint. Fig. Log =f (log ) Fig. esidual voltage () voltage index α vary with 8/0 current of (00~8000) (Varistor-φ4mm, m =738V) Some engineers including authors of this paper attempted to establish a V- formula that satisfied the three-requirements as mentioned above by a mathematical fitting equation, but until author s paper [5] published, there was no such a fitting equation reported. pparently mathematical fitting is a common way easy to do for a set of experimental data, but an appropriate formula was not obtained until our understing of the varistor changed. n order to clarify this issue, an example was given as Table Fig.., Fig.., Fig..3. Table esults of 8/0 surge current test (Sample -Varistor,34 34mm, m =646.V) Measured data Calculated data Current () Voltage (v) Log Log Log =/ 080 980 3.033.99-0.04 0 080 3.36 3.033-0.99 40 40 3.65 3.057-0.5580 990 360 3.997 3.34-0.8630 00 600 4.36 3.04 -. 30000 780 4.477 3.50 -.67 40400 980 4.606 3.97 -.3097 set of data of (~) listed in Table were measured pea values from a test on a sample of varistor. t is noted that the resistance (=/) is a fictive resistance, because the were not the same instant values. The above data were treated as polynomial fit to nd order : ) fit(log ) to (Log ), as illustrated by Fig... ) fit (log ) to (Log ), as illustrated by Fig... 3) fit (log ) to (Log ), as illustrated by Fig..3. t is clearly seen that the fitting curve Fig..3 is the best one because all test points were lying on the curve, moreover the curve was very close to a linear line. The following passage of this paper will show that the V- characteristic formula derived from fitting (log ) to (Log ) can well satisfy the Fig.. Log = f (log ) Fig..3 Log =f (log ). FOMS OF THE V- CHCTESTC FOMLS The V- characteristic formulas of a varistor that satisfy the three-requirements as above mentioned may be written as three different forms for different application purposes. They may be named voltage form, voltage ratio form, or current form. ) V- characteristic formula-voltage form:
, (6) Where: = esidual voltage on a varistor as a surge current pea of a specified waveform flows through it. 0 0 (7) [( ) log ] log (8) are constants of a resistance equation (9) lg 0 lg (lg ) (9) ) V- characteristic formula -residual voltage form: m (0) Where: m = initial varistor voltage at d.c.m. The word initial refers to as delivered or before degradation 3) V- characteristic formula current form: Y 0 () ( ) y ( ) 4 log( / ) (). METHODS ND STEPS TO DETEMNE THE V- CHCTESTC FOMLS Manufacturers of varistors should provide the V- characteristic formulas of delivered products for their users. ctually the characteristics of varistor units vary with type production lot, even among the same lot, significant differences in the V- characteristic may result from a 3%~ 5% difference in varistor voltage m. Therefore, n order to obtain a V- characteristic formula that agree well with the actual units, specimen should be properly sampled subjected to specified tests followed by a proper math fitting for the tested data. n instance below will mae the methods steps easy to be understood. There was a delivered varistor lot, the Part Number of which was 34S47 (34 34mm, m =470V), their V- characteristic formulas at 8/0 surge current were requested. ) Samples Three samples were taen from the lot, whose varistor voltage m lied in about the top, middle, lowest value of the lot respectively, say 484.V, 476.V, 458.9V ) Test Perform tests on samples one by one for residual voltages at every specified peas of the surge current.the actual readings of surge current pea () residual voltage pea () should be recorded, as Table. Table. Test record of current () voltage () Sample 458.9V Sample 476.V Sample 494.V L () L (V) M () M (V) H () H (V) 300 60 96 660 88 680 608 660 600 680 59 70 904 680 896 700 880 740 800 740 800 760 760 800 3760 800 370 840 3680 860 7600 940 7360 960 7360 980 4080 040 3970 060 3760 080 8400 00 7600 00 7800 60 4700 40 4700 40 4700 460 3) Calculations for of each sample Treat each set of data [,] of the three samples (Table ) as following steps: -Let x log, y log log( / ) -Calculate fitting equation of y=f(x) in accordance with polynomial least-squares fitting by use of the software such as Origin, the polynomial function to second order, that resulted in equations lie (3) or (4) for each of the three samples. y 0 x x 0 ( x) x (3) lg ( lg ) lg That is 0 (4) The equation (4) is also named esistance formula. The outcomes of the calculations for were summarized in Table 3. Table 3 Values of Sample 458.9V 476.V 494.V 0.965.98 3.04 -.893 -.8 -.87 0.0487 0.0465 0.04667 4) V- characteristic formula of each sample Substitute the values in Table 3 into the equations (6), (7) (8), the V- characteristic formula of each sample were obtained as equation (5.), (5.) (5.3), additionally according to equation (0) the residual voltage ratio formulas were obtained as equation (6.), (6.) (6.3) Sample 458.9V : 93 (5.)
0.893 0.0487 log Sample 476.V :. 0 959 (6.) (5.) 0.8 0.0465 log Sample 494.V :. 04 034 (6.) (5.3) 0.87 0.04667 log. 09 (6.3) 5) Chec deviations of the V- characteristic formulas of each sample Can the voltage formulas (5.)~(5.3), or the voltage ratio formulas(6.)~(6.3) satisfied the requirement of deviation? To answer this question let s mae a comparison between the calculated voltage ratio KC the measured voltage ratio KM, define a percentage deviation as below : D ev Where: C.(%) ( ) 00% M M m (7) measured voltage( see Table) C =calculated voltage ratio by use of equation (6.),(6.) or (6.3) respectively at the currents that is the same as the currents for M (Table ). The percentage deviations of the three samples were summarized in Table 4, in which the KC the KM for Sample 476.V 494.V were omitted for simplicity reason. M Table 4 Derivations of the formulas (6.), (6.) (6.3) from the actually measured values 458.9V 476.V 494.V D (%) C ev. (%) D ev. (%) D ev..35.360 0.64-0.88 0.89.438.46-0.88 0.5-0.7.48.478-0.8.0-0.3.63.600-0.93 0.0 -.05.743.776.86 0.0.36.048.007 -.0 -.3-0.64.66.73 0.30 0.4.3.65.67.3.56 0.90 3.094 3.04 -.74 -.3 -. ll percentage deviations in Table 4 were less than 3% that had satisfied the requirement of deviation 5) elations of residual voltage ratio to the m values of varistors to the current level n order to ascertain the differences in the voltage ratio cause by the different m values, Table 5 was tabulated, in which the residual voltage ratios at each of specified current values of the three samples were listed, the percentage deviations of (K-L) (K-H) from K-N were also given. Table 5, n example of K= f ( m, ) Current 458.9V (L) 476.V 494.V (H) K- L % K-N % K- H 00.336 -.8.35.4.37 500.404-0.84.46 0.99.430 000.493-0.47.50 0.67.50 000.60 0.60 0.37.66 5000.86 0.70.848 0.848 0000.7.44.087-0.4.08 0000.457.0.404-0.50.39 40000.9 3.08.84-0.78.80 50000 3.088 3.4.986-0.83.96 Table 5 provided some more important information: s far as the discussed lot of the varistor is concerned, the formula (6.) can also be used for the product of high- m, because of the deviations less than %, while it cannot be used for the product of low-m because of the maximum deviation up to 3.4%. However if a deviation of 5% could be accepted, then the formula (6.) can be used for all units of this lot. t is interesting to note that with the current varies from low level to high level, the residual voltage ratios of the low-m varistors exhibit an upward variation ( the deviations from minus to zero to plus), while it is in an opposite way for the high-m varistors. therefore at about the geometry medium current level (~5,in Table 5), the residual voltage ratios were almost independent of the m values of the varistors.
V. PPLCTONS OF V- CHCTESTC FOMLS The V- characteristic formulas discussed above can be a very useful tool for SPDs, ZnO arresters varistors, especially for coordination calculations between SPDs. The following is an instance. There was an SPD (st SPD) in the power distributor, a small sized SPD (nd SPD) built in a tester that was powered by the distributor. oth SPDs were varistor- based type of the following properties: stspd- 34 34mm, max=40,m=60v 70,where 0.47 0.05436 log nd SPD-φ0mm, max=3.5,m=60v 09,where 0.8 0.0666 log The problem is that as thest SPD is impinged by an 8/0-0 surge current, can the nd SPD be survival? To simplify the problem, the connection wires between the two SPDs were neglected, so that they are treated as a parallel combination. hence by use of the formulas () (), the currents passing through the two SPDs can be obtained at some arbitrary voltages from 950V to 050V, see Table 6. Figure 3 gave a further description of the current share. From Table 6 Figure 3, it is concluded that the nd SPD will be safe in case of an impinging current of 0 into the st SPD, because the current thru nd one is 488, smaller than its max (3.5). specially performed test has demonstrated that the current share listed in table 6 is true. Table 6 Currents thru the two paralleled SPDs Voltage Current () atio (V) st [] nd [] total(+) / 950 958.9 6. 75 4.43 050 59. 4.9 304 6.3 50 4974 695.4 5669 7.5 50 80 037 938 7.9 350 344 449 379 8.5 450 746 93 9393 9.04 550 3600. 488 6089 9.48 650 3080. 37 3399 9.88 n addition, giving attetion to the following matters is also necessary: ) Prior to performing the tests for V- characteristic formula,varistors should be subjected to an aging process to stabilize their properties, particularly m values. ) During the service life, the m value is going down gradually, while the residual voltage at a specified current is going up gradually with a smaller percentage variation than m variation. that means the V- characteristic is changing accordingly. 3) s for a given unit of varistor, the constants of in the V- characteristic formula depend to some extent on the waveform of test current, therefore, an independent test should be carried out for a changed waveform. V. CONCLSONS ecent years some new insights have been gained into the non-linear resistance properties of ZnO varistors including new V- characteristic formulas which described the relationship between the current voltage of a varistor t has been demonstrated that the V- characteristic formulas have great significance for solving the problems in following aspects: - Provide practical voltage limiting characteristics of varistors or SPDs to be used,that is the basis of overvoltage protection design. -realize full coordination between SPDs in a easy way. -Guide the practices of combining varistors in parallel to raise their ratings of surge current or energy. -y use of the information involved in the formulas, the fabrication processes of varistors may be managed controlled effectively. - The formulas can also be used for new product development. n application requested V- characteristic is planned in advance followed by a serial developing wors to realize it. CKNOWLEDGMENT The authors are deeply indebted to the engineers at the laboratory of the Chuang-jie Company for their valuable experiments tests EFEENCES [] M. Matsuoa, Nonohmic Properties of Zinc Oxide Ceramics Jpn.J.ppl.Phys.,0[6]736-46 (97) [] EC 605- nd edition Varistors for use in electronic equipment- Part : Generic Specification, Paragraph..3 (007-04) [3] T-T/K77: Characteristics of Metal Oxide Varistors (MOVs) for the protection of telecommunications installations (009-0) [4] erhard.wolff, n application oriented model for MOVs,[J], Ceramic transactions, 007,3:3~37. [5] N.F. Zhang, M.H.Wang, J.Shu, Characteristic equations of zinc oxide non-linear resistor Electroni Components Materials 3(5):- 7(0) Figure 3 Current share between st nd SPD