1. Introduction
Applying dimples and/or grooves to the lubricating area is an effective method for improving lubrication performance [
1]. Consequently, this technology is being used in various mechanical elements such as bearings [
2,
3,
4,
5], seals [
6,
7,
8], and piston rings [
9,
10].
In 1996, Etsion et al. [
11] calculated the frictional torque and leakage in a mechanical seal with a regular microsurface structure. They concluded that an increase in the load-carrying capacity (fluid film force) was obtained owing to cavitation in each dimple. This is an acceptable mechanism to explain the enhancement of lubrication performance on dimpled surfaces. Dimples contain diverging and conversing areas; hence, a fluid film cavitates within the diverting area. Owing to the emerged cavitation, the fluid pressure in the area cannot drop below the cavitation pressure at which cavitation starts to occur, and thus, it generates a load-carrying capacity for supporting applied loads. Other promising mechanisms for the expansion of hydrodynamic lubrication have also been proposed [
12,
13,
14,
15].
These publications have motivated subsequent researchers to investigate this topic, and the effects of surface textures have been actively studied recently with the objective of finding an optimal selection of the dimple size and density. For this purpose, experimentally understanding the behavior of the fluid film through the measurements of load-carrying capacity and friction and visualizations of the contact area. Shen et al. [
16] compared rectangular and triangular cross-sectional profiles and concluded that a rectangular profile could produce a higher load-carrying capacity. Yu et al. [
17] calculated the hydrodynamic pressures of circular, triangular, and elliptical dimples. Cross et al. [
18] performed visualization tests of circular pocket thrust bearings and reported that the cavitation area increased with the increase in rotational speed and lubricant viscosity. However, the effects of cavitation on the hydrodynamic lubrication of a dimpled surface have not been fully clarified. One of the problems for clarifying the cavitation effects is that for balancing with applied load, the fluid film thickness changes in conventional test devices. Therefore, the discussion of the cavitation effects on the bearing performance has included the film thickness effects.
To overcome this difficulty, we [
19] have developed an experimental device wherein the film thickness can be kept constant, and the load-carrying capacity and frictional torque are measured under various conditions. Using the device, the effects of the dimple shape on the hydrodynamic properties are discussed. This device allows discussing the cavitation effect with changing sliding speed and provides additional insight into the hydrodynamic characteristics of dimpled thrust bearings. The previous paper implied that the size of cavitation bubbles that appeared in the dimples had a considerable impact on the load-carrying capacity and frictional torque.
In this paper, we showed the hysteresis phenomena that appear in the hydrodynamic lubrication properties of a seal-type thrust bearing. The load-carrying capacity and frictional torque were measured with a fixed film thickness condition. For examining the size of the cavitation bubbles that occurred in various conditions, the lubricating area was observed during experiments. Based on these results, the relationship of the occurrence of cavitation to the hysteresis phenomena of the load-carrying capacity and frictional torque was discussed.
3. Experimental Results and Discussion
Figure 7 shows an example of cavitation occurring within a dimple. The upper glass plate was moved from the right to the left. The contact area was illuminated by a green laser. A cavitation bubble appeared at the leading edge of the dimple and conformed to a circular shape. The reformation boundary between the cavitation area and the fluid film area was clearly determined within the dimple. The reformation boundary is slightly convex to the flow direction.
It is known [
21] that sliding a flat surface against a curved surface separated with lubricant film results in the generation of positive hydrodynamic pressure in the convergent section of the gap and negative pressure in the divergent section. The dimple used in this study provides the convergent-divergent gap just described. Thus, it is expected that negative pressure occurs at the leading edge. When the negative pressure is lower than the cavitation pressure (gaseous pressure or vapor pressure) at which cavitation starts to occur, cavitation babbles appear in the dimple. The result shown in
Figure 7 clearly responded to the expectation.
Figure 8 and
Figure 9 show the relation between the measured load-carrying capacity and rotational speed. Plot means the averaged value, whereas the error bar means the standard deviation. The variation in the measurement results was very small. As shown in
Figure 8, the plane specimen did not generate the load-carrying capacity in both the increasing and decreasing processes because it did not have the convergent portion of the gap. This result has a good agreement with the fact that the parallel flat bearings cannot produce the hydrodynamic pressure and its integration value, i.e., the load-carrying capacity [
21]. On the contrary, as shown in
Figure 9, the dimpled specimen generated the load-carrying capacity, and interestingly the increasing and decreasing process of the rotational speed showed the different values. Consequently, the hysteresis phenomenon that had two loops appeared. No paper has been described and discussed this phenomenon on dimpled thrust bearings ever, hence the present result provides additional insight into the hydrodynamic characteristics of dimpled thrust bearings. With the visualization results shown in
Figure 10, the results are discussed below.
In region A of
Figure 9, cavitation bubbles appeared in some dimples. For example, at 200 min
−1, only three dimples had a cavitation bubble, as shown in
Figure 10; thus, the other dimples did not generate the load-carrying capacity. In addition, the number of film-ruptured dimples increased with the rotational speed. This means that in this region, the increase in the load-carrying capacity was affected by not only the rotational speed but also the occurrence of cavitation.
When the rotational speed reached region B, from 300 to 550 min−1, all dimples had a cavitation bubble. The cavitation bubble expanded with rotational speed. On the contrary, the load-carrying capacity also increased with the rotational speed, but that in region B was more gradual than that in region A. It is considered that in this region, as the cavitation bubbles already appeared in all dimples, the increment of the load-carrying capacity was affected mainly by the rotational speed.
In region C, the cavitation bubbles in each dimple overflowed, sometimes connecting with those in the next dimples, and grew similar to one large ring. In this region, the load-carrying capacity rapidly decreased, and the value was unstable and hence showed a larger standard deviation. This is because that the dimples are covered with cavitation bubbles, thereby preventing the hydrodynamic effect expected for the dimples. In addition, it should be considered that in the bearing designs, this unstably generated load-carrying capacity results in a self-excited vibration of the bearings.
Subsequently, with a decrease in the rotational speed, the cavitation bubbles backed to their dimples, and the load-carrying capacity increased and stabilized. In region D, the load-carrying capacity gradually decreased as the rotational speed decreased. In addition, it was smaller than that of the increasing process, even at the same rotational speed. When comparing the visualization results at 300, 400, and 500 min
−1, in which all dimples had cavitation bubbles in both processes, the cavitation bubbles of the decreasing process were observed to be larger than those of the increasing process.
Figure 11 shows the relation between the cavitation area ratio and the rotational speed. The cavitation area ratio is the ratio of the cavitation area to the dimple area, as shown in Equation (1).
where
is the cavitation area ratio,
Acav is the area of cavitation, and
Ad is the area of the dimple. The ratio was obtained from the average of 10 dimples in the three experiments. The variation in the measurement results of the cavitation area ratio is relatively large, but the difference between the increasing and decreasing processes is obvious. It can be said that the size of the cavitation bubbles affected the load-carrying capacity. In contrast, at a rotational speed of approximately 200 min
−1, the results in the increasing and decreasing processes crossed. In the decreasing process, region D, 10 dimples had a cavitation bubble, and the load-carrying capacity was greater than that of the increasing process in region A, wherein a few dimples generated the load-carrying capacity. As shown in
Figure 9 and
Figure 10, the cavitation bubbles shrink as the rotational speed decreases. When the glass plate stopped rotating, the cavitation bubbles split immediately and stayed within the dimples.
In the dimpled thrust bearing used herein, it is expected to occur either gaseous cavitation or vapor cavitation. When the hydrodynamic pressure decreases below the gaseous pressure, dissolved gases are released in the form of bubbles. If the pressure further decreases to below the vapor pressure, the lubricant evaporates. For the vapor cavitation, bubbles are expected to collapse and change back to liquid form immediately after the glass plate stops rotating. The present result indicated that the cavitation bubbles were gaseous as the cavitation bubbles remained within dimples. Since the air solubility in lubricant is very small [
22], it is expected that the dissolved gases are not able to immediately solve into the lubricant. It is considered, therefore, that larger quantities of gas released from the lubricant at a higher rotational speed in the increasing process had to remain even in the decreasing process. Consequently, the decreasing process had a larger cavitation area ratio and lower load-carrying capacity than the increasing process. It can be concluded that this is the reason for the appearance of the hysteresis phenomena on the load-carrying capacity.
Figure 12 shows the relation between frictional torque and rotational speed. The figure includes the theoretical result for the plane specimen. The theoretical frictional torque is calculated using the following equation [
21].
where
T is the frictional torque,
h is the film thickness,
η is the viscosity of the lubricant, and
ω is the angular velocity of the rotating glass plate. As shown in
Figure 12, the frictional torque of the plane specimen was in good agreement with the theory. The dimpled specimen exhibited a lower frictional torque than the plane specimen. This trend was more remarkable at higher rotational speeds. For the dimpled specimen, the frictional torque during the decreasing process was slightly lower than that during the increasing process. This is because in the decreasing process, the cavitation bubbles were larger, and the shear stress decreased. However, these values were very close, and the hysteresis loop like that in the load-carrying capacity was not observed. It is can be concluded that for the dimpled thrust bearings, the rotational speed is dominant in the frictional torque subjected to a constant gap than the cavitation bubbles that occur in the dimples.
4. Conclusions
In this study, we discussed the hysteresis phenomena of the hydrodynamic lubrication properties of the seal-type thrust bearings. The load-carrying capacity and frictional torque were measured with a fixed film thickness for separating the effect of changing film thickness. The visualization results of the lubricating area during measurements were used for the discussion of the hysteresis phenomena.
The dimpled specimen produced the load-carrying capacity, but the value of the decreasing process of the rotational speed was lower than that of the increasing process. The reason related to the result was the size of the cavitation bubble. In the decreasing process, larger sized cavitation bubbles were observed. In the higher rotational speed (the region C), the cavitation bubbles overflowed and sometimes connected with those in the next dimples. When this connection occurred, the load-carrying capacity rapidly decreased, and the value was unstable. It should be considered that in the bearing designs, this unstably generated load-carrying capacity results in a self-excited vibration of the bearings. The values of the frictional torque in the increasing and decreasing processes were very close, and the hysteresis phenomena in the frictional torque were not clear.
The numerical research on the hysteresis phenomena is necessary for further understanding. It would be important to obtain the relation of the cavitation pressure and air solubility in various operating conditions. The dimple parameters such as depth, diameter, area ratio and materials of lubricants and specimens interact in a complex manner. Further research on their optimization is necessary to improve the bearing performance.