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DRO Deakin Research Online, Deakin University’s Research Repository Deakin University CRICOS Provider Code: 00113B
The surface temperature prediction on steel-tool steel sliding pairs
Citation of the final article: Okonkwo, Paul C., Kelly, Georgina, Khan, Mohd Shariq, Pereira, Michael P., Rolfe, Bernard F. and Islam, Md Saiful 2019, The surface temperature prediction on steel-tool steel sliding pairs, in ICMSAO 2019 : 8th International Conference on Modeling Simulation and Applied Optimization, IEEE, Piscataway, N.J., pp. 1-5.
Published in its final form at https://doi.org/10.1109/ICMSAO.2019.8880313.
This is the accepted manuscript.
© 2019, IEEE
Reprinted with permission.
Downloaded from DRO: http://hdl.handle.net/10536/DRO/DU:30132563
The surface temperature prediction on steel-tool
steel sliding pairs
Paul C. Okonkwo
Department of Mechanical &
mechantornics, College of Engineeirng
Dhofar University
Salalah, Oman
pokonkwo@du.edu.om
Bernard F. Rolfe
Mechanical Engineeirng Department,
School of Engineeirng
Deakin University
Waurn Ponds, 3216, Victoria, Australia
bernard.rolfe@deakin.edu.au
Michael P. Pereira
Mechanical Engineeirng Department,
School of Engineeirng
Deakin University
Waurn Ponds, 3216, Victoria, Australia
michael.pereira@deakin.edu.au
Georgina kelly
Institute for Frontier Materials (IFM).
Deakin University
Waurn Ponds, Victoria, Australia
georgie.kelly@deakin.edu.au
Abstract—This study examines the theoretical and numerical
prediction of temperature at the sliding contact surfaces of steel-
steel pairs using the pin-on-disc and Archard models. The steel-
tool contact pair is important to the tribological and forming
community. The results show a good correlation between
numerical and theoretical calculation of contact temperature.
There was abrupt increase in the contact temperature at the
contacting surfaces as the sliding speed was increased beyond 35
mm/s. Localization of high peak temperature at the contact regions
of the sliding surfaces observed in this study may be important in
the wear mechanism of sliding bodies and wider manufacturing
community.
Keywords—Pin-on-disc, forming process, steel, temperature,
contact surfaces
I. INTRODUCTION
Flash temperature is the temperature that occurs at the
nanometre scale asperity during contact between sliding
bodies. Due to the magnitude of these flash temperatures,
compared to bulk and surface temperatures of the sliding
surfaces, the local mechanical properties of the interacting
materials can be affected [1]. The surface temperature is the
average of the flash temperature over the surface of the
sliding bodies. While flash temperature occurs at the
asperities of the contacting surfaces [2]. It is likely that the
magnitude of the flash temperature will be greater than that
of the surfaces temperature in any given tribological set up.
The generated temperature can cause or increase the severity
of wear mechanisms on the sliding surfaces and hence
influence the tribological behavior of the sliding surface
[3,4]. In sheet metal stamping, the sliding contact between
the sheet and the tool can result in high frictional heat
generation at the die radius-blank contact [5]. The generated
temperature may be influential in the increasing die
maintenance cost and scrap rate [4]. Understanding the
evolution of temperature in relation to the sliding surface
pairs may help in reducing tool wear in sheet metal
stamping.
Previous attempts have been made to use Finite Element
(FE) analyses to predict the moderate temperature increases
and relate it to the wear of tool steels used in sheet metal
forming [6-8]. The temperature rise on the die surface
experienced during a continuous strip drawing process of
aluminum sheet was examined by Groche et al. [6], using
FE analysis. It was predicted that a peak contact temperature
rise of 36°C occurred near the point of peak contact
pressure, corresponding to the location at which the
adhesive wear mechanism was found initiate. Recently,
Pereira et al. [5] predicted a temperature rise of up to 130°C
during ‘cold’ forming of advanced high strength steels,
which was attributed to the increased contact stresses and
increased plastic work associated with stamping higher
strength sheet materials.
The purpose of the present study is to simulate and predict
the surface temperature at the sliding contact of low carbon
steel against hardened D2 tool steel with a maximum
contact pressure of 1084 MPa. This contact pressure is
typical of the peak pressures experienced during sheet metal
forming operations using high strength sheet steel [9]. This
analysis will aid in understanding the temperature
distribution on the surfaces during the sliding contact
condition.
A. Numerical simulation setup
In this study, a 3D FE model was developed to simulate the
surface temperature generated as a result of frictional
heating during the pin-on-disc tests wear tests. The FE
model of the pin-on-disc test setup is shown in Figure 1.
(c)
(b)(a)
Pin radial surface
Half disc surface
Pin
disc
Figure 1: a) Full model showing pin in sliding contact with the
disc, b) the pin surface showing mesh refinement at the contact
surface, c) surface of the disc showing mesh refinement at the
region of contact between the disc and pin.
A general-purpose non-linear implicit finite element
analysis code (ABAQUS/Standard Version 6.14-1 [10]) was
used to conduct the simulation. All pre- and post-processing
was carried out using ABAQUS/CAE.
1) Key parameters and properties
The details of the thermal and material properties of the pin
and the disc used in the simulation are shown in Table 1.
Table: 1. Thermal and material properties of the specimens
Thermal and material
properties
Disc
Ball
Material definition
Deformable-
solid
Deformable-
solid
Elastic modulus (MPa) 210000 210000
Poisson’s ratio (-)
0.3 0.3
Friction energy heat
dissipation factor, ηF (-)
Default Default
Density (kg.mm-3)
7.9x 10-6 7.9x 10-6
Thermal conductivity (mJ.s-
1.mm-1.ºC-1)
20 51.4
Expansion coefficient ( ºC-1) 12x10-6 12x10-6
Specific heat capacity (J.kg-
1.ºC-1)
4.5x102 4.5x102
The key parameters required to develop the coupled
thermal-stress solution are listed in Table 1. These
parameters were defined for both the pin and the disc based
on characteristics appropriate for steel. The friction energy
heat dissipation fraction, ηF, defines to the amount of work
from friction that is converted into heat which is distributed
to the disc-pin surfaces. Due to the short time scale
involved, the effects of convection and radiation were
assumed to be negligible and were not accounted for in the
model.
2) FE mesh and geometry
The FE mesh of the disc and pin were refined at the region
of the contact to allow detailed analysis of the contact
between the pin and disc surfaces (as shown in Figure 1).
Four-node, thermally coupled tetrahedron elements with
linear displacement and temperature (C3D4T) were selected
and used to mesh all parts of both the pin and the disc. Tie
constraints were used to merge together dissimilar regions
of the model, allowing mesh transition from fine mesh at the
contact surfaces to coarse mesh at other parts of the pin and
the disc. The length of the element sides at the contact
regions of the pin and the disc were approximately
0.002mm. The objective was to reduce the number of
elements at the non-contact regions of the model, thereby
reducing the computation time, whilst allowing sufficient
mesh density at the contact zones to allow the contact
pressure and temperature distributions at the pin-disc
interface to be accurately simulated. In the experimental
setup, the disc is harder than the pin material [11]; hence,
the disc surface was set as the master surface in each of the
contact interactions, while the pin was set as the slave.
3) Load and boundary conditions
Load of 5N was applied on the top of the pin typical of that
used in the experimental study resulting in maximum
contact pressure experienced during a typical stamping
process [12]. Angular velocities of 1.52rad/s, 4.45rad/s,
21rad/s and 31.76 rad/s which is equivalent to 12mm/s,
35mm/s, 170mm/s and 250mm/s sliding speed respectively
were applied at the last step of the model. Time steps of
41.08s, 14.14s, 2.99s and 2.02s for 12mm/s, 35mm/s,
170mm/s and 250mm/s were also applied at the last step to
give four revolutions each of the simulation tests. A
Coulomb friction model was used to represent the friction
between the blank and the tool surface using an isotropic
penalty friction formation in Abaqus [10]. The friction
coefficient applied (µ=0.50) was taken from the steady state
value obtained from the experimental pin-on-disc tests
conducted at ambient temperature [11].
The simulation process was divided into two steps: a contact
step; and then a rotating step. At the contact step, a normal
load was applied downwards through the ball to apply
contact loading between the disc and the pin. Then,
followed the rotation step where the disc was made to rotate
in the z- axis. The top of the pin and back of the disc were
set to zero to act as heat sink. The purpose was to allow any
heat dissipated from the top of the pin and the bottom of the
disc not to go back to the system. Temperature was queried
at different nodal on the pin from the contact to some
distance away from the contact with the disc as shown in
Figure 2. The objective was to investigate how the
temperature varies as it goes away from the contact. The
model is first validated and then the simulation results are
subsequently presented and discussed below.
a) Pin and disc reference nodal positions
The cross section of the pin and the disc show different
nodal positions as shown in table 2.
Table: 2. Pin and disc reference nodes down the contact
surfaces
Pin Id Number
Distance away from contact [mm]
Disc Id Number
Distance away from contact [mm]
P1 0.0 D1 0.0 P2 0.01 D2 0.01 P3 0.03 D3 0.02 P4 0.23 D4 0.03 P5 0.57 D5 0.05 P6 1.96 D6 0.08
B. Theoretical calculations and FE model validation
The results from theoretical calculations of contact pressure
and surface temperature, using well-known Hertz [13]
developed models from the literature are presented. The
results from these calculations were used to help to develop
and validate the FE model developed.
1) Contact pressure validation.
The FE model was validated against a standard analytical
Hertz. The numerical calculation result of the Hertz contact
pressure using Hertz [13] developed models are shown in
Figures 2 and 3. During the FE model development process,
the static contact pressure distribution was compared to the
Hertzian contact pressure distribution in order to check the
accuracy of the contact model and choose an appropriate
mesh density at the contact zone. The result of the predicted
FE model at the end of the first step (where the pin in loaded
against the disc prior to sliding) is shown in Figure 2. As
shown, both models predict similar trends, but there are
some discrepancies at both edges away from the center of
contact. This is difference in sensitivity of the mesh relative
to the radius geometry. However, minimum number of
elements of about nine at the small contact zone of the
surface compared to 12 elements distributed at the other
areas of the sliding surface provides a good correlation of
the contact pressure at the contact region. Hence it can be
concluded that the FE model accurately captures the
theoretical results and can be used to validate the FE model
for further investigations.
-0.06 -0.04 -0.02 0.00 0.02 0.04 0.06
0
200
400
600
800
1000
1200
Hertz
FE
Con
tact
pre
ssur
e[M
Pa]
Radial distance[mm]
Figure 2: Hertz (black line) and FEA (red line).
2) Peak surface temperature
The results obtained from the simulation are presented and
compared with Archard’s theory for temperature of rubbing
surfaces to validate the sliding speeds selected for this study.
The sliding speeds were selected based on Archard’s theory
to give an equal surface temperature.
R² = 0.9854
0
10
20
30
40
50
60
70
0 50 100 150 200 250 300
Surf
ace
te
mp
era
ture
[°C
]
Sliding speed [mm/s]
simulation result
Archard's result
Figure 3: Results of the calculated idealised temperatures
and simulation tests at different sliding speeds.
In each of the simulations, only the speed was varied while
other parameters were kept constant. The simulation model
was investigated against the idealized case of directly
loading the pin at a contact load of 5N, while varying the
sliding speeds between 12mm/s, 35mm/s, 170mm/s and
250mm/s. Comparing the Archard’s model with the FE
results shows that a good correlation was found, R2=0.9854,
between the idealized case and the FEA simulation. Hence,
the result shows that there is a good fit between the
theoretical and FE results.
C. Results
Our validation shows that the FE model results correlate
well with theoretical calculations of contact pressure and
peak surface temperature. Hence, the validated FE model
can be used to investigate the temperature distribution at the
pin and disc surfaces.
1) Pin temperature distribution
Figure 4 shows the peak temperature of P1 at different
sliding speeds. The P1 nodal temperature, which is at
contact with the disc node D1 shows highest peak
temperature for the different sliding speed tests. The result
also shows that the peak temperature increases
approximately linear with the sliding speeds.
Figure 4: Peak temperature for pin node P1 versus sliding
speed.
a) Temperature distribution along the pin surface
The contour plots result of the temperature distribution
along the surfaces of the pin for all the sliding speeds are
shown in Figure 8. The results show that temperature is
localised at the pin contact area with the disc and gradually
decreases as it goes away from the contact region. The
localisation of the peak temperature at the contact area on
the pin surface was observed for all the sliding speed tests.
Figure 5a shows the peak temperature rise of 2.2°C at the
contact area of the pin for the 12mm/s tests, followed by
temperature rise of 8.2°C for the 35mm/s tests. Temperature
rise of approximately 30°C and 36°C each were recorded for
the 170 and 250mm/s tests respectively (Figure 5c and 5d).
These peak contact nodal temperatures agree with the
contact nodal temperature observed down the pin surface
(Figure 4).
P2-1 P3-1 P4-1 P5-1P1-1
P5-1P4-1P3-1P2-1P1-1
(a) (b)
P5-1
P5-1P4-1P3-1P2-1P1-1
(c) (d)
P1-1 P4-1P3-1
P2-1
Figure 5: Simulation results of contour plots of 12mm/s,
35mm/s, 170mm/s and 250mm/s showing temperature
distribution along the surface of the pin.
2) Disc temperature distribution
The result of the nodal temperature measured at different
contact points on the disc to investigate the temperature
distribution on the disc surface are displayed in Figure 6.
Similarly, reference nodes were selected some distance
away from the pin-disc contact for different sliding speeds.
The peak temperature increases, almost linearly, with the
sliding speed. The result is in agreement with the similar
increase in the peak temperature observed for the pin
reference node P1 shown in Figure 4.
Figure 6: Peak temperature for Disc node D1 against sliding
speed
a) Temperature distribution along the disc surface
The contour plots of the temperature distribution along the
disc surface for all the four sliding speeds are shown in
Figure 7. The general result shows that the magnitude of
localised peak temperature at the contact area decreases as
the distance away from the contact region increases. Peak
temperatures of 4.2°C and 16.1°C were observed for
12mm/s and 35mm/s speed tests respectively. For the higher
sliding speed tests of 170mm/s and 250mm/s, 51.7°C and
61.7°C peak temperature rise were observed at the contact
region on the disc surface (Figure 7). Another observation
was that the peak temperatures at different speeds on the
disc surfaces (Figure 7) were generally higher than the peak
temperature rise observed on the pin surface (Figure 5). This
was attributed to the difference in the thermal conductivities
of the two sliding pairs (Table 1).
D1-1
D2-1
D3-1
D4-1
D5-1
D1-1
D2-1
D3-1
D4-1
D5-1
(a)(b)
D1-1
D2-1
D3-1
D4-1
D5-1
D1-1
D2-1
D3-1
D4-1
D5-1
(d)(c)
Figure 7: Simulation results of contour plots of 12mm/s,
35mm/s, 170mm/s and 250mm/s showing temperature
distribution along the surface of the disc.
D. Discussion
The results show that the prediction of accurate surface
temperature could be made using either the Archard’s theory
[3] or the simulation method. Increase in the surface
temperature was observed as the sliding speed was
increased. It has been shown previously in the literature that
frictional heat is generated due to welding and plastic work
of the asperities [14]. In a high sliding speed process, the
generated heat does not have sufficient time to dissipate and
can cause a significant rise in temperature as observed in
this result. Figure 4 shows that the surface temperature at
the contact region of the sliding surface of the pin is
significantly higher than temperature at other regions on the
sliding surface. Similar increase in the contact surface
temperature compared to other region on the contacting
bodies have been reported by Ashby et al. [15] to be due to
flash temperature generated as a result of asperities
deformation. The result of temperatures at different nodes
on the disc also showed increasing surface temperature as
the sliding speed was increased (Figure 6). However, sliding
at lower sliding speed did not show significant difference
between the contact nodal surface temperature and those
from other points away from the disc contacting surface
(Figure 4).
Notably, at 170 mm/s and 250 mm/s, the temperatures at the
contact node of the disc are significantly higher than
temperatures on the other nodes, similar to that of the pin
(Figure 7c). It was found in the results (Figure 4 and 6), that
the surface temperature rises for the disc showed higher
temperature values for the contacting nodal temperature
compared to that of the pin nodal temperature. An
explanation to the above observation could be that in pin-
on-disc test, the heat flows into the sliding bodies.
Subsequently, the temperature distribution on the sliding
bodies is influenced by the partitioning factor and the
thermal conductivities of the material pair in sliding contact
as reported by Bowden and Tabor [16]. The above
observation is of practical value to wear mechanisms and
the manufacturing industry.
E. Conclusion
The study investigates two techniques of estimating surface
temperature. The results show that the well-known
behaviour that surface temperature increases as the sliding
speed is increased was observed for all tests, even at the
slowest sliding speeds (<20mm/s). There is a good
correlation between the theoretical and numerical
calculation of surface temperature. The result provides more
confidence in the predicted FE results. The magnitude of the
surface temperature predicted at the surface of the disc and
pin are significantly high at the contact region and increased
abruptly as the sliding speed was increased (˂35mm/s).
Considering the distribution of the temperature along and
below the sliding surfaces, it becomes clear that frictional
heating does not result in any significant bulk temperature
heating. The numerical models show that, at the higher
sliding speeds, the surface of the disc experiences over 10
times larger temperature rise compared to the material that
is just 0.01mm below the surface.
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Recommended