physical properties measurements within ......this report presents the results of the corium c-32...
TRANSCRIPT
PHYSICAL PROPERTIES MEASUREMENTS WITHIN MASCA PROJECT.
Asmolov V.G., Abalin S.S., Merzlyakov A.V.
Russian Research Centre “KURCHATOV INSTITUTE”
Abstract
Measurements of corium physical properties started within of RASPLAV project have been continued within MASCA project. Experimental data on viscosity, density and liquidus temperature of C-32 corium are presented in report.
Within MASCA project the phenomenon of uranium and zirconium extraction was found at interaction of molten corium and metal iron. The melt is stratified on oxide and metal parts. Physical properties of the metal part were studied within MASCA project. The experimental data on conductivity, thermal conductivity, viscosity and liquidus temperature of “metallic body” are presented in report.
1
Introduction
Within the context of the OECD MASCA project, the works on the measurement of the corium physical properties started under the RASPLAV project were proceeded. Physical properties of the “metallic body”, the alloy produced on the suboxidized corium interaction with steel (iron), were measured too.
This report presents the results of the corium C-32 viscosity and density measurements and data on the measurements of electric conductivity, thermal conductivity, viscosity and temperatures for phase transients.
Viscosity of the c-32 corium The method of damping of torsional oscillation of a cylinder filled with studied liquid was
employed for the measurement of viscosity as it was in the OESD RASPLAV project. The technique theoretical basis, the procedures for the test performance and for the experimental data processing were described earlier [1]. Figure 1 illustrates the test facility layout.
Figure 2 demonstrates the example of the test thermogram.
Figure 1. The Test Facility Layout 1 – Vessel 2 – Heater 3 – Inductor coil 4 – Support 5 - Corium 6 – Cylinder 7 – Rod 8 – Diaphragms 9 – Mirror 10 – Laser He-Ne 11 – Scale 12 – Thread 13 – Windows 14 - Pyrometer
1298
3
13
14
5
1310
11
7
6
2
4
1
Figure 2. The Example of the Test Thermogram on the Measurement of Viscosity
24 36 48 60 72 84 96 108 120Time (min)
1300
1400
1500
1600
1700
1800
1900
2000
2100
2200
2300
2400
2500
2600
2700
Tem
pera
ture
(oC
)
Experimental Results
Figure 3 shows the damping decrement of the torsional vibrations of the cylinder with a molten corium versus the temperature.
Up to 2200°C (Figure 3 does not show this area), the system behaves as a solid body and is characterized by a low damping factor that is practically independent of the temperature. Under the temperatures higher than 2370°C, the system is characterized by a high damping factor that is slowly decreased with the temperature increase. This behaviour is typical of normal liquids. Within the temperature range 2200 - 2370°C, the system is characterized by a noticeable growth of the damping factor with the temperature increase. This temperature range may be considered as a simultaneous existence of a solid and liquid phases.
Figure 3. The Damping Decrement versus the Temperature
2200 2300 2400 2500 2600Temperature (oC)
0
50
100
150
Dec
*100
0
3
The values were calculated for the corium C-32 kinematic viscosity under the temperatures higher than 2370°C. Figure 4 presents the kinematic viscosity versus the temperature.
Figure 4. The Kinematic Viscosity versus the Temperature
2350 2400 2450 2500 2550 2600Temperature (oC)
0.45
0.50
0.55
0.60
0.65
0.70
0.75
0.80
0.85
V*E6
(m2 /s
)
It should be noted that the obtained dependence is very close to that measured earlier for the C-22
corium [1].
Conclusion
The C-32 corium kinematic viscosity was measured within the temperature range 2380 - 2600°C. The obtained dependence is close to that measured earlier for the C-22 corium.
Density of the C-32 Corium
A modification of the hydrostatic weighing method called the submersible cylinder method was chosen to measure density.
The Test Facility
Figure 5 illustrates the test facility layout.
4
Figure 5. The Test Facility Layout
1
2
3
4
5 13
14 12
15
8
7
6
91011
16
The corium (3) was placed into the tungsten crucible (2). The crucible was covered with a
tungsten cover with a pipe the end of which came out into the facility cold area. A tungsten cylinder (4) was hanged in the crucible above the corium. The upper part of the pendant consisting of a thin tungsten rod (5) and metal wire (14) was attached to the platform of the electronic scales (16). The weight measurement accuracy was 5 mg. A microprocessor was installed into the scales that allowed to record their readings in the computer. The scales protective shielding (15) and the facility casing were conjugated through the hermetic seal (13). The scales protective shielding (15) with the scales inside could move relative to the facility casing (1). Their relative positions might be noted at the scale (12) accurate to 0.05 mm. The crucible with the corium was placed on the support (9) inside the heater. The crucible bottom temperature was measured by a pyrometer. A thermostating embedding (7) of a high thermal conductivity was attached around the heater to reduce the temperature gradients. The whole facility was enclosed by a thick layer of thermal insulation (8).
The Test Procedure and Results
At the test beginning, the tungsten cylinder position was chosen to be above the melt level. Then, the protective shielding with the scales inside went down with a pitch of one millimeter. At each position of the scales, the difference between the initial cylinder weight and the current one was noted. Figure 6 demonstrates the example of this dependence.
5
Figure 6. Dependence of the Difference between the Initial Value for the Cylinder and Pendant Weight and the Current Value of that at Each Position of Scales
-5 0 5 10 15 20 25 30 35H (mm)
-2.0
0.0
2.0
4.0
6.0
dM (g
)
The change in the weight is not observed in the course of the scales relocation when the tungsten
cylinder bottom does not touch the melt surface (Scale divisions higher than 26 mm correspond to this case in Figure 6). A drastic increase in the weight due to the corium surface tension forces is observed on the cylinder bottom touching the melt surface. On the further cylinder immersion into the melt, the cylinder weight is linearly decreased with the immersion depth due to the buoyancy force. The inclination of line was determined by the least-squares method. The melt density was calculated by the following formula:
dxdM
sSs1
1s1
C
⋅
−+
⋅−=ρ
ghPPhdM )()( 0 −
=
where: ρ - density; S – the cylinder cross-section area; SC – the crucible cross section area; P0 – the cylinder weight in argon; P(h) – the cylinder weight immersed in the depth h; X – cylinder position. The measurements were performed at several temperature values. Table 1 presents the obtained
results.
Table 1. The C-32 Corium DensityTemperature (oC) Density (g/cm3) Dispersion (g/cm3)
2482 7.40 0.17 2482 7.61 0.24 2534 7.42 0.21 2585 7.39 0.19
6
The C-32 corium surface tension was measured earlier within OECD RASPLAV project. Simultaneously, the melt density might be evaluated. The following value for density 7.49 ± 0.44 g/cm3 was obtained from the data of the surface tension measurement.
Conclusions
The facility was developed, designed and fabricated to measure density of high-temperature melts. The facility operating temperatures ranges up to 2700ºC.
The test facility, procedures of the measurement and data processing were tested in the experiments with water. Measured water density coincides with the tabular data. Dispersions are less than the experimental errors.
Data on the C-32 corium density were obtained within the temperature range 2482 - 2585ºC.
C-32 Corium Liquidus Temperature Measurement
Several techniques can be used to measure liquidus temperature of corium. These techniques have been developed within OECD RASPLAV&MASCA projects
• Viscosity technique • Gas bubble technique • Thermogram recording technique.
The example of liquidus determination by viscosity technique is presented in Figure 7.
Figure 7. Decrement vs Temperature (62UO2 + 38ZrO2 mol%)
Temperature ( C)o
Dec
rem
ent 1
000 Liquidus
temperature
The facility schematic for liquidus measurement by gas bubble technique is presented in Figure 8.
7
Figure 8. Gas Bubble Technique: Test Section 1.Vessel; 2.Tungsten crucible; 3.Corium; 4.Capillary; 5.Guide; 6.Heater; 7.Thermostat; 8.Thermal insulation; 9.Support; 10.Peep hole; 11.Pyrometer; 12.Scale; 13.Pressure-gauge; 14.Ar-admission valve;
15.Sealing unit.
The dependence of pressure vs. temperature is presented in Figure 9.
Figure 9. Gas bubble technique: Pressure vs. temperature. (54.5UO2 + 14.5ZrO2 + 31 Zr)
2320 2340 2360 2380 2400 2420 2440Temperature (oC)
3
4
5
6
7
8
9
Pres
sure
(kPa
)
Liquidus
8
Figure 10. Comparison of Liquidus Measurement by Three Different
Technique2300 2325 2350 2375 2400 2425 2450
Temperature (oC)
3
4.5
6
7.5
9
Pres
sure
(kPa
)
0.04
0.06
0.08
0.1
0.12
Dec
rem
ent
DecrementPressure
0.2
0.3
0.4
0.5
0.6
dT/d
τ (o C
/s)
dT/dτ
As one can see three different techniques gave very close results.
The Choice of the Material for the “Metallic Body” Melt Retention
The choice of the material for the “metallic body” retention presents quite a complicated problem. The thing is that such metals as iron and zirconium are parts of the “metallic body” composition. Iron interacts practically with all metals and alloys that makes it problematical to employ metal crucibles. Free zirconium is a very active metal that interacts with oxides.
On measuring the “metallic body” electric conductivity, it was noted that the alloy electric conductivity was close to zirconium one. This situation is possible if the alloy components containing iron were included into the metal matrix based on zirconium.
Figure 11 demonstrates photographs of the alloy structure after the MA-2 test.
Figure 11. Photographs of the Alloy Structure after the MA-2 Test
416 мкм 20 мкм The light phase is the phase based on zirconium, the dark one is based on iron. It can be seen that
the dark phase is enveloped by the light phase. This alloy structure allows to hope that the same materials that are used for the retention of metal zirconium may be used for the melt retention. At the initial stage of the zirconium metallurgy development, graphite was employed for melting of that. Molten zirconium interacts with graphite surface producing on that a layer of zirconium carbide, which hinders transport of carbon atoms to the metal zirconium melt.
9
We employed crucibles made of graphite with density higher than 1.7 g/cm3. The crucible was preliminary cladded with zirconium carbide produced on molten zirconium interaction with graphite surface. With graphite density less than 1.64 g/cm3, crucibles appeared to be with open porosity and metal zirconium infiltrated the whole volume of the graphite wall. With graphite density higher than 1.68 g/cm3, zirconium carbide was generated only on the inner surface of the graphite crucible.
Figure 12 shows photographs of the graphite crucible cross-sections after melting of the “metallic body” alloys in them.
The first photograph shows the crucible after melting of the “metal body” sample produced in the T-7 test. The second one shows the crucible with a large volume of the “metallic body” (U0.44Zr0.56)0.2Fe0.8 synthesized artificially from pure metals. Gross formula of the synthesized body coincides with the gross formula obtained from the chemical analysis of the “metallic body” after the T-7 test. The visible destruction of the graphite crucible wall by the “metallic body” melt was not observed in both tests. The third photograph presents an enlarged scale of a part of the boundary between the “metallic body” and graphite wall.
Figure 12. Photographs of the Graphite Crucible Cross-Sections after Melting of the “Metallic Body” Alloys in Them
Crucible with T-7 Alloy Crucible with (U0.44Zr0.56) 0.2 Fe0.8 Alloy The Boundary Area
The performed tests have shown that crucibles made of dense graphite covered with zirconium carbide protective claddings may be used for the retention of the “metallic body” melt.
The “Metallic Body” Solidus and Liquidus Temperature Measurements
The method based on the investigation of thermograms obtained on heating and cooling of the sample under study was used for the measurement of the phase transfer temperatures. Alloys prepared artificially from pure metals were used to work through the technique and perform the first tests. Figure 13 demonstrates the example of thermogram obtained on cooling Zr0.25Fe0.75 melt.
10
Figure 13. The Thermogram Obtained on Cooling of the Zr0.25Fe0.75 Alloy
68 72 76 80 84
time (min)
1200
1400
1600
1800
tem
pera
ture
(0 C)
Two transitions where heat is released on cooling are seen distinctly. The image becomes still
more obvious if it is represented in the coordinates “time” and “temperature derivative with respect to time”. Figure 14 illustrates the example of the similar dependence of the same Zr0.25Fe0.75 alloy.
Figure 14. Temperature Derivative versus Temperature of the Zr0.25Fe0.75 Alloy
1200 1400 1600 1800
temperature (0C)
-1600
-1200
-800
-400
0
400
dT/d
t (m
K/se
c)
The observed transition temperatures coincide with a good accuracy with the data of the known
phase diagram Zr-Fe. The “metallic body” sample produced in the T-7 test was available for the team investigating
physical properties. Figure 15 shows the thermogram obtained on this sample cooling.
11
Figure 15. The Thermogram Obtained on the T-7 Sample Cooling
1000 1200 1400 1600 1800 2000
temperature (0C)
-1600
-1200
-800
-400
0
400
800
dT/d
t (m
K/se
c)
Only one phase transition was revealed in this sample within the temperature range
2000 - 1100ºC. To determine the U/Zr ratio impact on the liquidus temperature, several samples were fabricated
from pure metals. A common gross formula may be expressed as (UxZr1-x)0.2Fe0.8 Figure 16 demonstrates the liquidus temperature versus the parameter X. This Figure presents
data of other authors for the compositions Zr0.2Fe0.8 [2] и U0.2Fe0.8 [3] too.
Figure 16. The Liquidus Temperature versus the Parameter X
0 0.2 0.4 0.6 0.8 1X
1100
1200
1300
1400
1500
1600
Tem
pera
ture
(oC
)
T (liq)Prepeared metallic bodyT-7 Metallic bodyRR
ef. [1]ef. [2]Ref. [6] Ref. [7]
One of the artificially fabricated samples had exactly the same U, Zr and Fe ratio as that in the T-7 test. However, it can be distinctly seen in Figure 16 that the liquidus temperature for the sample from the T-7 test is somewhat higher than that for the artificially fabricated sample of the same composition. This may be explained by the availability of small quantities of oxygen and carbon in the sample from the T-7 test.
12
The “Metallic Body” Viscosity Measurement
The method of damping of torsional oscillation of a cylinder filled with the melt was used to measure the “metallic body” viscosity. Figure 1 illustrates the facility layout.
Due to the fact that quite insufficient quantity of material produced on the corium and steel interaction was available for the researchers, viscosity was measured in the samples synthesized artificially from pure metals. Figure 17 shows the example of the thermogram from the test on viscosity measurement.
Figure 17. Example of the Thermogram on Viscosity Measurement
0 40 80 120 160
time (min)
1200
1400
1600
1800
2000
2200
tem
pera
ture
(0 C)
The measurements were performed at the stage of initial heating, at the stage of slow cooling and
at the stage of reheating. The coincidence of the measurement results from all three stages testifies that the system is in the equilibrium state.
The measurements were performed in the crucibles made of dense carbide cladded with zirconium carbide. Figure 18 presents the crucible cross-section after one of the tests.
Figure 18. The Crucible Cross-Section after the Test on Viscosity Measurement
13
At the initial stage of investigations, viscosity of model compositions consisting of zirconium and iron was measured. Figure 19 shows viscosity versus the temperature for three model compositions with different contents of zirconium and iron.
Figure 19. Viscosity versus the Temperature for Two Model Compositions with Different Contents of Zirconium and Iron
1600 1700 1800 1900 2000 2100
temperature (0C)
0
0.2
0.4
0.6
0.8
1
Vis
cosi
ty . 1
06 (m
2 /sec
)
viscosity Fe-ZrZr0.33Fe0.67Zr0.25Fe0.75
It is seen that viscosity is decreased with the increase of the iron content. Viscosity of the compound containing uranium, zirconium and iron was measured. The gross
formula of the composition (U0.44Zr0.56)0.2Fe0.8 is close to that of the sample produced in the T-7 test. Figure 20 presents the damping decrement versus the temperature. Up to the temperature 1380ºC,
the system behaves as a solid body and is characterized by a low damping decrement. Under the temperature higher than 1600ºC, the system is characterized by a high decrement factor that does not practically depend on the temperature. This area may be construed as a liquid with a low fluidity activization energy. The intermediate area of 1380 - 1600ºC is characterized by the non-monotone behaviour of the damping decrement and may be construed as a two-phase area with simultaneous presence of the solid and liquid phases. Kinematic viscosity was calculated in the area of the theory applicability. Figure 21 illustrates kinematic viscosity versus the temperature.
14
Figure 20. The Damping Decrement versus the Temperature
1400 1600 1800 2000 2200
temperature (oC)
50
100
150
200
250
300
350
Dec
rem
ent *
1000
Figure 21. The “Metallic Body” Viscosity versus the Temperature
1500 1600 1700 1800 1900 2000 2100
temperature (C)
0
0.2
0.4
0.6
0.8
1
visc
osity
*106 (
m2 /s
)
Electric Conductivity of the “Metallic Body” Produced on the Corium Interaction with Steel in the TULPAN-7 Test
Electric conductivity is one of the most important characteristics of the material. The measurement of electric conductivity and its temperature dependence allows to judge about the nature of chemical linkage between the components of the studied material. The sample of 9 × 10 × 21 mm3 size cut out of the “metallic body” ingot obtained in the T-7 test was used for the investigation. Table 2 demonstrates the “metallic body” chemical analysis.
15
Table 2. The “Metallic Body” Chemical Analysis
Element proportion (mass %) U Zr (Zr+Fe+U)free Fe C Nb O (diff.)
U/Zr (at./at.)
27.2 13.26 * 59.37 0.143 * 0.03 0.79 * - not measured
The Method
The four-probe method was employed in the work to measure electric conductivity. Figure 22 illustrates the method pattern.
Figure 22. The Test Pattern
Four electrodes are connected to the sample. They include two current ones by which direct
current of the set value is transmitted through the sample and two voltage ones intended to measure the voltage drop in the sample part. The voltage drops for current several values were measured under the set temperature. The Volt-Ampere characteristic was plotted. Figure 23 illustrates this characteristic obtained in the test.
16
Figure 23. The Volt-Ampere Characteristic
0 0.5 1 1.5 2 2 I (A)
.5
0
40
80
120
U (µ
V)
The slope of that was determined by the least-squares method. The specific resistance was
calculated by the formula
DS
dIdU
⋅=ρ
where ρ - specific resistance; dU/dI – the slope of the Volt - Ampere characteristic; S – cross section area of the sample; D – distance between voltage electrodes. The sample with electrodes connected to that was placed into a small heater to measure the
temperature dependence of electric conductivity. The heater was surrounded outside by a thick layer of thermal insulation. The sample temperature was measured by a thermocouple.
The Test Results
Figure 24 demonstrates the ratio of specific resistance under the temperature t°C to specific resistance under the temperature 20°C as a function of temperature. The linear growth of specific resistance is observed at the temperature rise. This dependence is typical of metals.
The temperature coefficient for specific resistance was determined by the least-squares method. Table 3 presents the obtained values for specific resistance of the studied sample under 20°C and for the temperature coefficient of specific resistance. Figures in round brackets are the measurement errors (dispersion). The same table contains the corresponding values for pure iron [4], zirconium [5], and uranium [6] for the comparison. It is seen that specific resistance of the alloy under study is very close to that of zirconium and the temperature coefficient of specific resistance – to that of uranium.
17
Figure 24. The Temperature Dependence of Specific Resistance
0 40 80 120 160 200Temperature (oC)
0.9
1
1.1
1.2
1.3
1.4
R(t)
/R(2
0)
Table 3. Specific Resistance (ρ) and Temperature Coefficient of that (α) of the Alloy
and Its Components
Material T (oC)
ρ ⋅ 108
(Ohm ⋅ m) α ⋅ 103
(1/K) Referenc
e Alloy under study 20 43 (4.3) 2.38
(0.17) This work
Fe 20 9.8 6.2 [1] Zr 27 43.5 3.8 [2] U 25 25 - 34 2 – 2.8 [3]
Conclusion
Specific resistance and the temperature coefficient of that for the “metallic body” sample obtained in the T-7 test were measured. The measurements were performed within the temperature range 20 - 200°C. The electric characteristics of the sample under study are similar to those of the metal ones. Specific resistance is very close to that of zirconium and the temperature coefficient of specific resistance – to that of uranium.
Thermal Conductivity of the “Metallic Body” Produced on the Corium Interaction with Steel in the TULPAN-7 Test
Thermal conductivity of the “metallic body” produced on the corium interaction with steel in the T-7 test was measured. The same sample was employed for the measurements that was used to measure conductivity.
Table 2 presents the “metallic body” chemical analysis.
The Method
Figure 25 demonstrates the pattern of measurements.
18
Figure 25. The Pattern of the Test on Thermal Conductivity Measurement
The sample was placed between the heater and heat receiver. The heater and heat receiver were
fabricated from copper to minimize the temperature gradients. The copper heater was heated by an electric coil. Four thermocouples were mounted in the assembly, that is, one – on the heater, one – on the receiver and two ones – on the sample. Readings from thermocouples were memorized in the computer.
The technique for thermal conductivity measurement is based on the solution of the non-steady-state equation:
2
22
xTa
tT
∂∂
⋅=∂∂
with the initial condition 0T)0,x(T =
and boundary conditions: )t(F)t,0(T =
Lr
rLx
Qdt
dTCxTS +
⋅=
∂∂
⋅⋅λ−=
On meeting the following conditions:
1dt
))t(F(dLnt;t
aL
2t;Qdt
dTC;CC 0022
2
Lr
rrs <<⋅=π
⋅>>>
⋅<<
the solution may be presented in form
)TT(SDQ
dtdTC
32L
rr −⋅
⋅
+
⋅=λ
where: a2 - thermal diffusivity; λ - thermal conductivity; S - cross section area of sample; Cr - thermal capacity of receiver; Cs - thermal capacity of sample; QL – loses; Tr - temperature of receiver; L - length of sample; D - distance between thermocouples.
The Test Results
Figure 26 demonstrates the example of readings from thermocouples.
19
Figure 26. The Example of Readings from Thermocouples
0 20 40 60 8Time (min)
0
0
50
100
150
200
250
Tem
pera
ture
(o C)
Figure 27 presents the sample thermal conductivity values calculated according to the test data. The tests were performed with the heater different power. It is seen that thermal conductivity does
not practically depend on the temperature within the used temperature range. Table 4 presents the values obtained on processing the test data.
Figure 27. The Values of Thermal Conductivity Obtained in Tests
80 120 160 200 240Temperature (oC)
0
4
8
12
16
Ther
mal
con
duct
ivity
(W/m
/K)
POWER of HEATERP=89 WP=35WP=44 W
20
Table 4. Thermal Conductivity Data Obtained in Tests
# P (W) T(oC)
The
rmal
con
duct
ivity
(W
/(m⋅K
))
Num
ber
of
expe
rim
enta
l poi
nts
Dis
pers
ion
due
to
stat
istic
(W
/(m⋅K
))
Dis
pers
ion
due
to
syst
emat
ic e
rror
(W
/(m⋅K
))
Tot
al d
ispe
rsio
n (W
/(m⋅K
))
1 44.5 113 - 201 13.68 989 0.39 1.3 1.3 2 22.2 49 - 134 12.32 2075 0.98 1.3 1.6 3 88.7 152 - 216 13.39 353 0.21 1.3 1.3 4 35.3 84 - 174 13.53 1381 0.42 1.3 1.4 84 - 216 13.53 2753 0.41 1.3 1.4
The table cites the following: • the heater power P(W); • the temperature range in which the technique is applicable; • the average value for thermal conductivity; • the number of experimental points; • thermal conductivity dispersion determined by the statistics; • thermal conductivity dispersion due to systematic errors (inaccuracy in the embedding of
thermocouples, edge effects and so on); • the estimate of total dispersion. At low power values (22 W) of the heater, thermal losses become of a significant matter. In this
case, the technique underestimates the values of thermal conductivity and the statistical error is increased. For this reason, these results were not further used in the calculation of the average value of thermal conductivity given in the Table lower line.
It is of interest to compare the obtained values for thermal conductivity of the sample under study with those of metals Fe, Zr, U composing the sample. Thermal conductivity of metals was taken from the reference book [7]. Figure 28 demonstrates graphically the similar comparison.
21
Figure 28. Thermal Conductivity of the Sample and Its Components
10 100 1000o
0
20
40
60
80
Thermal conductivityAlloy [this work]U Ref.[4]Zr Ref.[4]Fe Ref.[4]
y(
)
It is seen that thermal conductivity of the alloy is lower than that of any metal composing the alloy. Of all the metals, thermal conductivity of zirconium is the closest to that of the alloy. It should be noted that electric conductivity of the alloy is also close to that of zirconium.
Conclusion
Thermal conductivity of the “metal body” produced on the corium interaction with steel in the Tulpan-7 test was measured within the temperature range 84 – 216°C. The value for thermal conductivity 13.5 W/(m ⋅ K) was obtained accurate to (dispersion) 1.4 W/(m ⋅ K).
22
23
References
1 S.S. Abalin, V.G. Asmolov, V.D. Daragan, Ye.K. D’yakov, A.V. Merzlyakov, V.Yu. Vishnevskiy, Kinematic viscosity measurement of C-100 and C-22 corium. OECD RASPLAV Project, RP-TR-18, 1996. 2 J. Nonorganic Chem., 8(9), 1963, pp. 2118-23 (Russ). 3 Canad. Metallurg. Quart., 1966, 5(4), pp. 355-65. 4 N.I. Koshkin, M.G. Shirkevich, Handbook on Elementary Physics, Moscow, Nauka, 1972, (Russ.) 5 V.E. Peletzkii, E.A. Belskaya, Electrical Resistance of Refractory Metalls, Moscow, “Energoizdat”, 1981. (Russ.) 6 J.J. Katz, E. Rabinovitch, The Chemistry of Uranium, v.1, NY, 1951. 7 V.S. Chirkin, “Thermo-physical properties of nuclear technics materials”, Moscow, Atomizdat, 1968, (Russ).