Abstract

In view of the coexistence of wheel profile wear (WPW) and wheel diameter difference (WDD) on an actual subway line, a dynamic analysis method based on coupling between WPW and equivalent in-phase WDD was proposed. Based on the measurements from a subway vehicle in operation on this line, dynamics modeling and calculations were performed for a single carriage of this vehicle. Later, the interaction between the effects of WPW and equivalent in-phase WDD on the vehicle dynamic performance was analyzed, and the dynamic response in the presence of coupled damage was compared between the outer and inner wheels. Furthermore, the difference in the dynamic response caused by different positions of the larger-diameter wheels (i.e., on the inner track or outer track) was analyzed for the case where equivalent in-phase WDD occurred between the front and rear bogies. The results show that when the vehicle ran on a straight line, the coupling between WPW and WDD reduced the vehicle’s stability but improved its ride comfort. When the vehicle traveled on a curved line, it showed reductions in the lateral wheel/rail contact force, derailment coefficient, axle lateral force, and wear index if the outer wheels had a larger diameter. As a result, the deterioration of the vehicle’s dynamic performance due to the increasing degree of WPW slowed down, and its curve negotiation performance improved. Meanwhile, the outer wheels had significantly greater lateral wheel/rail contact force, derailment coefficient, and wear index compared to the inner wheels. When a −1 mm WDD was coupled with the worn wheel profile for 14 × 10⁴ kilometers traveled, the dynamic performance indexes of the vehicle were close to or even exceeded the corresponding safety limits. The findings can provide technical support for subway vehicle maintenance.

1. Introduction

During subway operation, longitudinal and lateral wheel/rail forces will arise from traction and braking, as well as the centrifugal effect in the process of curve negotiation, resulting in various types of damage to wheels and rails. Moreover, due to growing subway traffic flow and train speed, frequent starting and braking, and the increasing number of small-radius curved lines, wheels are suffering increasingly severe damage. In particular, wheels are often subject to more diverse, complex damage rather than one damage type. The major types of wheel damage include wheel profile wear (WPW), wheel diameter difference (WDD), and tread peeling. WPW and WDD usually coexist as the most common coupled damage, which is difficult to solve, imposes high repair cost, and has a significant impact on the safety and comfort of subway vehicles. Therefore, studying the influence of WPW coupled with WDD on subway vehicle dynamics has practical significance.

For a subway vehicle in operation, its wheels are inevitably subject to tread and flange wear caused by wheel/rail contact and braking, resulting in changes in wheel profiles. As the distance traveled increases, the degree of wear tends to increase and wheel profiles tend to vary.

A great deal of research has investigated the influence of WPW on vehicle dynamics by theoretical, simulation, or experimental approaches. Cui et al. studied the influences of different wear forms on vehicle dynamics by field test combined with simulations and analysis and found that the false flange created by wheel wear would endanger the operational safety of the vehicle [1]. Lu et al. created a dynamic model for a Type B metro vehicle with Universal Mechanism (UM), a software package for simulation of multibody system dynamics, and analyzed the influence of wheel wear on vehicle dynamic performance and the characteristics of wheel/rail contact damage [2]. Yao et al. studied the effects of wheel wear on the dynamics performance of a high-speed train and suggested that the vehicle system’s transverse stability index linearly decreased as the depth of wheel wear increased [3]. S. Pradhan et al. [4] investigated the influences of various stages of wheel wear on the dynamic responses such as curving performance and then evaluated the critical speed and ride comfort of the railway vehicle on the simulated test track to justify the maintenance schedule. Sun et al. simulated the multipoint contact and non-Hertzian contact between worn wheel and rail using a modified Kik-Piotrowski method. The wheel/rail normal vertical force, wheel/rail creep force, and contact patch shape predicted with this method are in good agreement with the results of contact calculation [5]. By measuring tread and rail profiles, Zong et al. analyzed the impact of equivalent conicity on the nonlinear critical speed of metro vehicles [6]. Shi et al. experimentally tested the dynamic performance of a high-speed train running at 300 km/h and revealed that the vibration of axle box, frame, and car body tended to intensify gradually with increasing wheel wear [7]. Using a vehicle-turnout coupling dynamic model, Xiao et al. analyzed the dynamic response of a high-speed train with wheel wear when it passed a turnout. They found that wheel-rail wear caused an increase in wheel/rail vertical force and a decline in wheel/rail transverse force [8]. Xu et al. studied the influence of the increase in wheel wear on vehicle dynamics through simulation with SIMPACK, with wheel/rail contact being considered as the entry point. The results showed a marked decreasing trend in the vehicle’s critical speed [9]. Xie et al. found that as the speed increased, the influence of wheel harmonic wear on vehicle stability became increasingly significant [10]. The stochastic model for vehicle-track systems provided by Xu and Zhai enables good analysis of dynamic response and reliability of a vehicle-track system in the presence of varying wheel wear and stochastic track irregularity [11]. Liu and Bruni investigated the influence of individual wheel profiles measured on a rail vehicle on the vehicle’s dynamics in the context of multibody (MB) simulations [12].

In terms of the effect of WDD on dynamic performance, Lyu et al. showed that when the initial WDD was large, cracks and localized wear occurred soon and always on wheelsets with smaller diameters, and they can deteriorate the dynamic performance of vehicles [13]. Sun et al. analyzed the influence of WDD on the stability, safety, and comfort of a vehicle traveling along a bridge by simulation and suggested that WDD should be strictly controlled for high-speed trains [14]. Jiang et al. constructed a nonlinear dynamic model for a metro vehicle and then calculated the critical speed, stability, safety, and wear power of the vehicle for different WDDs. The results showed that with the increase in coaxial WDD, the critical speed decreased sharply while the lateral stability and wear power increased significantly [15]. Yan et al. studied the influence of front-axle WDD, rear-axle WDD, equivalent in-phase WDD, and equivalent antiphase WDD on the safety of a locomotive during motion on straight line and curved line [16]. Based on a high-speed train and 12# turnout of a passenger dedicated line in China, Chen et al. developed a vehicle-turnout dynamic model and systematically analyzed the stability, safety, and ride comfort of a high-speed vehicle passing through a turnout for different types and magnitudes of WDD. They suggested that the operational limits for in-phase and antiphase WDDs be set at 2 mm and 3 mm, respectively and the limit for coaxial WDD above which primary and secondary maintenance is needed be set at 1.5 mm [17]. Based on an analysis of the types of WDD, Ma et al. discussed the influence of WDD on the stress state and movement of wheelsets [18]. He et al. suggested that WDD can lead to a significant increase in lateral wheel/rail contact force for a locomotive running on a straight line [19]. Wang et al. found that the yaw angle of wheelset, lateral displacement, wear power, and creep force of wheelset sharply increased with greater WDD [20]. Liu et al. analyzed the influence of coaxial WDD on a locomotive’s dynamic performance. The results revealed that the coaxial WDD changed the position of wheel-rail contact and increased the equivalent stress of the rail, which could impair the locomotive’s dynamic performance [21]. Based on an electric locomotive equipped with three-axle bogies, Zhang et al. investigated the influence of WDD at different axles on locomotive dynamic performance. The results showed that both derailment coefficient and wheel unloading rate increased with increasing WDD at the first axle and decreased with increasing WDD at the other two axles [22]. By analyzing the forces acting on a bogie with WDD, Chi et al. theoretically inferred that the existence of WDD changed the balance position of the wheelset center and thereby changed the wheel/rail contact relationship and affected the vehicle system’s stability [23].

These researchers have looked at the influence of WPW or WDD on vehicle dynamics from various perspectives and offered insights into how to solve relevant dynamic performance problems. Research related to WPW focused mainly on how wear depth, harmonic wear, and crater wear affect vehicle dynamic performance, and research related to WDD emphasized the effect of the type and range of WDD.

However, most of these studies only considered the influence of a single type of wheel damage on vehicle dynamics, neglecting the coexistence of multiple damage types and the interaction between the effects of different damage types on vehicle dynamics. The present study analyzed the data on wheel damage measured on a specific subway line and found that WPW and equivalent in-phase WDD are the main types of wheel damage in vehicles running on this line. So, WPW and equivalent in-phase WDD were considered together to further analyze the influence of coupled wheel damage on vehicle dynamic performance.

Moreover, the existing research only considered front bogie, neglecting a real situation where both front and rear bogies have WDD. So, the present study considered the occurrence of equivalent in-phase WDD at the front and rear bogies and then analyzed the difference in dynamic response caused by different positions of the larger-diameter wheels, i.e., on the inner track or outer track.

Additionally, in vehicle dynamics modeling, these researchers only considered wheel damage in a single wheelset and set other wheelsets as standard ones. This cannot accurately reflect the actual characteristics of wheel damage. The present study not only considered the characteristics of damage in all wheels based on measured data but also compared the dynamic responses of the inner and outer wheels.

2. Analysis of Measured Wheel Data

A subway vehicle operating on a subway line has been tracked in this study. This vehicle consists of 6 carriages, each having 8 wheels. The profiles and diameters of these 48 wheels have been measured since the beginning of the vehicle’s operation. The wheel profile and diameter data were collected when the distance traveled reached 5 × 10⁴, 8 × 10⁴ and 14 × 10⁴ km.

2.1. Measured Wheel Profiles

Wheel/rail contact can be divided into three regions, as shown in Figure 1. Region A is the contact region between wheel tread and railhead. Wheel/rail contact in this region usually occurs when a vehicle travels on a straight line or a large-radius curve. Region B is the region of contact between wheel flange and track corner, which often occurs when a vehicle runs on a small-radius curve. In region C, wheel/rail contact is highly unlikely to occur.

Figure 1 

Wheel/rail contact regions.

The profiles of the subway vehicle’s wheels were tracked and analyzed. It was found that wheel wear was located largely in region A, as shown in Figure 1. The wear in this region is called tread wear. The test vehicle in this study has 6 carriages, and 1 carriage was selected for dynamic modeling to allow for more time-efficient simulations and calculations. An analysis of the measurements found that the differences in maximum tread wear depth between the 6 carriages were about 10%, and the worst wheel wear occurred in the No. 2 carriage. So, No. 2 carriage was selected for dynamics modeling. The measured profile of this carriage’s 8 wheels was used for its dynamics model in order to allow the results to reflect its actual status.

Figure 2 illustrates the maximum tread wear depths in the 8 wheels measured when the distance traveled reached 5 × 10⁴, 8 × 10⁴, and 14 × 10⁴ km. The left wheels were numbered 1, 3, 5, and 7, and the right ones were numbered 2, 4, 6, and 8.

Figure 2 

Measured tread wear depths.

In order to reduce cuspidal points on tread profile and prevent accumulation of errors during curve fitting, a data processor based on cubic spline interpolation algorithm was compiled in MATLAB software to smooth the wheel tread data [24]. The computational formula iswhere is the cubic spline smooth curve, is the random error, is the experimental data, and [a, b] is the range of abscissa of the wheel profile.

Then, the 8 wheels’ profiles for 5 × 10⁴, 8 × 10⁴, and 14 × 10⁴ km traveled shown in Figure 3 were used for subsequent modeling.

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Figure 3 

Measured wheel profiles. (a) First-axle wheel profiles. (b) Second-axle wheel profiles. (c) Third-axle wheel profiles. (d) Fourth-axle wheel profiles.

2.2. Analysis of the WDD Data

For a subway vehicle, the degree of wear varies between wheels due to the complex, variable conditions during actual operation. Figure 4 shows the four types of WDD for two-axle bogies, with “” at the top indicating the direction of vehicle movement. They are as follows: (I) front WDD (the left and right wheels on the front axle have different diameters), (II) rear WDD (the left and right wheels on the rear axle have different diameters), (III) equivalent in-phase WDD (the smaller-diameter wheels on the front and rear axles are on the same side), and (IV) equivalent antiphase WDD (the smaller-diameter wheels on the front and rear axles are on opposite sides) [25]. According to the literature [26–27], of the four types of WDD, equivalent in-phase WDD has the greatest influence on the curve negotiation performance of vehicles.

Figure 4 

Types of WDD: (a) front WDD, (b) rear WDD, (c) equivalent in-phase WDD, and (d) equivalent antiphase WDD.

The diameters of wheels of a subway vehicle were tracked. This wheel diameter measuring instrument is used for measuring the diameter of a wheel’s rolling circle. It works by three-point indirect measurement and shows readings on a mechanical indicator, which allows users to get diameter reading directly. It is characterized by small measurement error, high indication stability, low weight, and ease of use.

An analysis of the measured diameter data reveals that there was equivalent in-phase WDD between the front and rear bogies of each carriage after a long-term operation on the same line. In other words, the smaller-diameter wheels of the front and rear bogies were on the same side, as illustrated in Figure 5. For this reason, equivalent in-phase WDD was applied to modeling to study its effect on vehicle dynamic performance.

Figure 5 

Equivalent in-phase WDD between the front and rear bogies.

WDD refers to the difference between the nominal rolling radii of the left and right wheels. A wheelset’s diameter difference is defined bywhere is the diameter of the wheel on the inner track (inner wheel); is the diameter of the wheel on the outer track (outer wheel); and indicates that the inner wheel diameter is greater than that of the outer wheel diameter.

According to a relevant regulation of China, a wheelset needs to be repaired when its coaxial diameter difference reaches 1 mm. Given the possibility of machining error, the technical specification for wheelset assembly allows WDD of less than 0.3 mm [28]. Table 1 provides the values of equivalent in-phase WDD set in this study.

3. Dynamics Models for the Vehicle-Track System

3.1. Vehicle Dynamics Model

A vehicle dynamics model was constructed based on the parameters of the Type B vehicle tracked. It consists primarily of 1 vehicle body, 2 frames, 4 wheelsets, 8 axle boxes, and primary and secondary suspension systems. The vehicle body, frames, and wheelsets are all treated as rigid bodies, and each has six degrees of freedom (DOFs), including surging, swaying, heaving, rolling, pitching, and yawing. The whole vehicle has 50 DOFs in total. The dynamic equation of motion for the vehicle is as follows [29]:where M, C, and K are the mass matrix, damping matrix, and stiffness matrix, respectively, for the vehicle system; X is the generalized displacement; and is the generalized load.

The vehicle dynamics model is shown in Figure 6, and the main parameters of the vehicle are presented in Table 2 [30].

Figure 6 

Vehicle dynamics model.

The track was simulated with standard UIC60 rail and German high-speed spectrum was applied for track excitation. The subway line was simulated with two line types: straight line and curved line, with each being 1000 m long in total. The curved line is C-shaped and composed of five parts, which are a straight segment, a transition curve, a circular curve, a transition curve, and a straight segment in sequence. The circular curve has a radius of 300 m. The composition is shown in Table 3. Moreover, the curved line was set as a right-turning line. Along the direction of vehicle movement, the left wheels were designated as the outer wheels and the right wheels as the inner wheels. If its direction was changed to left-turning because the wheel diameter difference changes symmetrically from −1 mm to 1 mm, the dynamic performance change rule is the same, and only the inner wheel and outer wheel are exchanged.

Based on the actual operational characteristics of the test line, variable velocity was set for the vehicle to simulate its acceleration, coasting, and deceleration, and the maximum velocity was set at 65 km/h. Then, the functional relationship between vehicle velocity and distance traveled s is obtained:

The piecewise velocity function (s) above can be used to simulate the process of velocity change as the initially static vehicle starts by traction, then coasts, and finally brakes to stop along a 1000 m curved line.

Hertz’s theory is used for solving normal contact problems, and Kalker’s simplified theory and the corresponding FASTSIM algorithm are applied to calculate the distribution and magnitude of the tangential creep forces within the contact patch.

3.2. Model of Coupling between WPW and WDD

During modeling of vehicle dynamics, the wheel wear data measured when the distance traveled reached 5 × 10⁴, 8 × 10⁴, and 14 × 10⁴ km were imported into the wheel profile database to obtain worn wheel profiles, which are represented by S1, S2, and S3, respectively (Table 4). Then, worn wheel profile models were constructed by applying the profile data shown in Figure 3 to the eight wheels of each carriage.

Later, the WDD model was built by setting wheel diameters using the Geometry module in SIMPACK. In accordance with Table 1, the WDD was set at 9 values, including −1 mm, −0.8 mm, −0.5 mm, −0.2 mm, 0 mm, 0.2 mm, 0.5 mm, 0.8 mm, and 1 mm.

After that, the coupling between WPW and WDD was modeled by applying the diameter values to corresponding worn wheel profiles in the vehicle dynamics model.

3.3. Validation of the Vehicle Dynamics Model

Ride comfort is an important factor considered in assessing the comfort of vehicles. Ride comfort index and vibration acceleration are widely adopted to evaluate the dynamic performance of vehicles around the world [31]. The ride comfort index of a vehicle, W, can be calculated as follows [32].where is the vibration acceleration (cm/s²); is the frequency of vibration (Hz); and is the correction factor related to f.

After the vehicle dynamics model was constructed based on the parameters of the actual vehicle and the line status, the vertical acceleration and ride comfort index of the model were calculated. The results were then compared with the measured data to verify the reliability of the model so as to ensure accurate results of the subsequent simulation.

A vibration test was conducted on the studied vehicle, and the test data were collected with COINV DASP, a software package developed by the China Orient Institute of Noise and Vibration. In accordance with the Railway vehicles, specification for evaluation of the dynamic performance and accreditation test (GB5599-1985), an accelerometer was mounted on the floor to the left of the front bogie (1 m from the bogie pivot center) to measure the vehicle’s acceleration and the sampling frequency was 1024 Hz. The acceleration data obtained are plotted in Figure 7.

Figure 7 

Comparison of vertical acceleration.

The simulated acceleration was compared with the measured acceleration and then the ride comfort index was calculated from the simulated and measured data using equation (5).

As can be seen in Table 5, the maximum peak vertical acceleration obtained by simulation is slightly smaller than the measured value. The reason is that some parts of the vehicle’s structure were simplified in modeling. However, the amplitudes of the simulated and measured values varied in similar ways. The simulated time of the maximum peak is quite close to the measured value, suggesting the high reliability of the vehicle dynamics model proposed in the paper.

4. Influence of WPW Coupled with WDD on the Dynamic Performance of a Vehicle Running on a Straight Line

Three worn wheel profiles for 5 × 10⁴, 8 × 10⁴, and 14 × 10⁴ km traveled (see Figure 3 and Table 4) and nine WDDs between −1 mm and +1 mm (Table 1) were set based on the measured data from the test vehicle. Later, the vehicle dynamics model shown in Figure 6 was used to calculate and analyze the influence of WPW coupled with equivalent in-phase WDD on the stability and ride comfort of the vehicle.

4.1. Hunting Stability

Hunting stability is an extremely important aspect of vehicle dynamic performance. Critical speed is the most direct indicator for hunting stability assessment. When a vehicle runs at a normal speed, it is necessary to ensure the overall stability of the vehicle system and protect it from instability; otherwise, the vehicle will snake heavily, thus affecting its operational quality and safety.

In this paper, the critical speed was calculated using the acceleration reduction method. At first, sinusoidal excitation was applied to rails on the straight line and a force was exerted on the vehicle body (The magnitude is half the weight of the vehicle body and in the opposite direction of the vehicle movement). Then, the vehicle started to move and its equilibrium position during vibration was observed. The vehicle velocity at this position was defined as the critical speed. As shown in Figure 8, the equilibrium point in condition S1 occurred at 171 km/h, so the critical speed was 171 km/h.

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Figure 8 

Schematic diagram of critical speed. (a) Critical speed in condition S1. (b) Detail.

Figure 9 illustrates the critical speed for different degrees of WPW coupled with different WDDs. The following are shown in Figure 9:(1)It is clear from the figure that for a given WDD, increasing the degree of WPW gradually reduced the critical speed and thereby the vehicle stability. When the WDD was −1, −0.8, −0.5, −0.2, 0, 0.2, 0.5, 0.8, and 1 mm, the critical speed for worn wheel profile S3 decreased by 32.3%, 30.3%, 35.1%, 33.7%, 33.3%, 32.9%, 31.5%, 33.8%, and 36.3%, respectively, compared with that for S1. The rate of decrease differs slightly between different WDDs.(2)For a given worn wheel profile, the critical speed in the presence of WDD was lower that in the absence of WDD. Besides, as the absolute value of WDD increased, the critical speed tended to decline and had a roughly symmetric distribution. This trend is most marked for S1, where the critical speed for a −1 mm WDD () decreased by 47 km/h compared to the critical speed for a 0 WDD. In condition S3, when WDD was −1, −0.8, 0.8, and 1 mm, the vehicle’s critical speed was 86, 92, 96, and 91 km/h, respectively, which are all below the maximum allowable speed for running along the studied line, 100 km/h. The actual maximum speed of a vehicle running on a straight line is restricted by its critical speed. If the actual speed exceeds the four critical levels, it will snake heavily and lose lateral stability, leading to passenger discomfort and even derailment in a worse-case scenario.(3)Whether the larger-diameter wheels are on the inner side or outer side has little influence on the critical speed. As the WDD changed, the critical speed had an approximately symmetrical distribution.

Figure 9 

Critical speed.

The analysis above demonstrates that the critical speed tended to decline with increasing WDD and WPW. This is primarily because the presence of WDD caused the rolling wheelsets to deviate from the centerline of the track and thereby increased wheelsets’ lateral displacement and angle of offset. Consequently, the geometry of wheel/rail contact was altered and the critical speed declined. Meanwhile, as the equivalent conicity increased with the increasing degree of WPW, the nonlinear critical speed of the vehicle gradually declined.

4.2. Vehicle Ride Comfort

The operational performance of trains is commonly measured by the ride comfort index, which can be graded in accordance with Table 6.

Figure 10 demonstrates the influence of different degrees of WPW coupled with different WDDs on the vehicle’s ride comfort. Figures 10(a) and 10(b) illustrate the lateral ride comfort index and vertical ride comfort index, respectively.(1)For a given WDD, the ride comfort index tended to increase with increasing the degree of WPW in both the vertical and lateral directions. When the WDD was −1, −0.8, −0.5, −0.2, 0, 0.2, 0.5, 0.8, and 1 mm, the lateral ride comfort index for worn wheel profile S3 increased 18.5%, 19%, 19.1%, 21.1%, 23%, 20.8%, 17.2%, 16.9%, and 15.9%, respectively, compared to that for S1. The corresponding increases in the vertical ride comfort index were 25.9%, 27.3%, 30.5%, 38.2%, 45.1%, 41.5%, 39.9%, 38.3%, and 30.6%, greater than the increases in the lateral ride comfort index. Moreover, as the absolute value of WDD increased, the increase in the ride comfort index caused by profile change tended to decline slightly. This indicates that the presence of WDD can inhibit the negative effect of profile change on the ride comfort index to some extent.(2)Figure 11 illustrates how the vibration acceleration varied with the degree of WPW when the WDD was 0. It was found that the vertical and lateral accelerations increased with greater WPW, which is consistent with the trend in the ride comfort index described in (1).(3)For a given worn wheel profile, as the absolute value of WDD increased, the lateral and vertical ride comfort indexes declined compared to those for 0 WDD, and their distributions are approximately symmetric. An inference is that a proper WDD can help improve the ride comfort of vehicles. In addition, the approximately symmetric distribution suggests that whether the larger-diameter wheels are on the inner side or outer side has little effect on the ride comfort index.

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Figure 10 

Ride comfort index. (a) Lateral ride comfort index. (b) Vertical ride comfort index.

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Figure 11 

Vibration acceleration. (a) Vertical acceleration. (b) Lateral acceleration.

As the degree of WPW increased, the amplitudes of vertical and lateral accelerations expanded, increasing the ride comfort index. In the presence of WDD, the creep forces on the left and right wheels caused the wheelsets to yaw clockwise, resulting in lateral displacement of wheelsets. When equivalent in-phase WDD occurred between the front and rear wheelsets of a bogie, the front and rear wheelsets would move towards the same side, which will not cause a significant deflection of the bogie. Therefore, a very small angle of offset between the front and rear wheelsets will help improve the ride comfort of the vehicle system [33].

5. Influence of WPW Coupled with WDD on the Vehicle’s Curve Negotiation Performance

Three worn wheel profiles for 5 × 10⁴, 8 × 10⁴, and 14 × 10⁴ km traveled (denoted as S1, S2, and S3) and nine WDDs between −1 mm and +1 mm (Table 1) were set based on the measured data from the test vehicle, the same as in Section 4. Then, the vehicle dynamics model shown in Figure 6 was used to calculate and analyze the influence of WPW coupled with equivalent in-phase WDD on lateral wheel/rail contact force, derailment coefficient, axle lateral force, and wear index.

5.1. Wheel/Rail Lateral Force

Figure 12 shows the lateral wheel/rail contact force for different degrees of WPW coupled with different WDDs.

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Figure 12 

Lateral wheel/rail contact force. (a) Inner wheel (right wheel). (b) Outer wheel (left wheel).

The following are shown in Figure 12:(1)For a given WDD, the peak lateral wheel/rail contact force increased as the degree of WPW increased (i.e., as the wheel profile changed from S1 to S2 and then to S3). This increase was especially noticeable on outer wheels, where the lateral wheel/rail contact force was 1.67 times greater than that on inner wheels. Table 7 shows the increase in peak lateral wheel/rail contact force on outer wheels due to profile change from S1 to S3 for different WDD (−1, −0.8, −0.5, −0.2, 0, 0.2, 0.5, 0.8, and 1 mm).(2)For different worn wheel profiles, the lateral wheel/rail contact force was relatively small when outer wheels had larger diameters than inner wheels’ (WDD > 0). As can be seen in Table 7, the increase in lateral wheel/rail contact force for zero WDD was higher than those for nonzero WDD. This suggests that the presence of WDD reduced the peak lateral wheel/rail contact force and suppressed its increase due to profile change to some extent.(3)When the larger-diameter wheels were on the inner side (i.e., WDD < 0), the lateral wheel/rail contact force was relatively larger. When a -1 mm WDD was coupled with profile S3, the peak lateral wheel/rail contact force on the outer wheels reached up to 38.74 kN, close to the safety limit of 41.29 KN.

After wheels began to wear, highly nonlinear contact occurred between wheel and rail and wheel/rail interaction deteriorated, significantly increasing the amplitude of the wheel/rail lateral force. As the presence of WDD caused lateral movement of the wheelset, the lateral creepage between wheel and rail tended to increase. When the larger-diameter wheels were on the inner side, the lateral creep was in the same direction as the centrifugal force. When the larger-diameter wheels were on the outer side, the lateral creep was in the opposite direction of the centrifugal force, thereby reducing the wheel/rail lateral force.

5.2. Derailment Coefficient

Figure 13 shows the derailment coefficient for different degrees of WPW coupled with different WDDs.

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Figure 13 

Derailment coefficient. (a) Inner wheel (right wheel). (b) Outer wheel (left wheel).

The following can be seen from Figure 13:(1)For a given WDD, the derailment coefficient of both the left and right wheels increased with the increasing degree of WPW, and this trend was more marked for the outer wheel (left wheel). The increases in derailment coefficient due to profile change from S1 to S3 for different WDDs (−1, −0.8, −0.5, −0.2, 0, 0.2, 0.5, 0.8, and 1 mm) are presented in Table 8. It is clear that the increase in derailment coefficient grew sharply when the WDD reached 0.8 mm and 1 mm.(2)When the larger-diameter wheels were on the outer side (i.e., WDD > 0), the derailment coefficient was relatively low, indicating that the vehicle’s stability against derailment can be improved by positioning larger-diameter wheels on the outer side. When the larger-diameter wheels were on the inner side (i.e., WDD < 0), the derailment coefficient was relatively high. When a −1 mm WDD was coupled with the worn wheel profile S3, the peak derailment coefficient was 0.84, higher than the safety limit of 0.8.(3)The derailment coefficient of outer wheels (left wheels) was higher, and its peak value was 1.91 times greater than inner wheels.

The variation pattern of derailment coefficient is similar to that of wheel/rail lateral force. This is because WPW and WDD have a greater effect on wheel/rail lateral force than on wheel/rail vertical force, and derailment coefficient is the ratio of wheel/rail lateral force to wheel/rail vertical force.

5.3. Axle Lateral Force

Figure 14 depicts the axle lateral force for different degrees of WPW coupled with different WDDs. As shown in the figure,(1)For a given WDD, with the increase in the degree of WPW, the axle lateral force increased at a growing rate. The increases in axle lateral force due to profile change from S1 to S3 for different WDDs (−1, −0.8, −0.5, −0.2, 0, 0.2, 0.5, 0.8, and 1 mm) are presented in Table 9.(2)It is clear from Figure 14 and Table 9 that as the WDD changed from -1 mm to 1 mm (i.e., as the difference between outer wheel diameter and inner wheel diameter increased), the magnitude and growth rate of axle lateral force declined at a decreasing rate. This suggests that when the outer wheel diameter was larger than the inner wheel diameter, the growth in axle lateral force due to increased profile wear was slowed down to some degree. If inner wheels had a greater diameter, the growth in axle lateral force would speed up.(3)When a −1 mm WDD was coupled with worn wheel profile S3, the peak axle lateral force reached 37.51 kN, which approaches the safety limit of 37.75 kN. This suggests that the vehicle exerted relatively large lateral forces on the tracks in this case, which could cause lateral track movement and even derailment.

Figure 14 

Axle lateral force.

Axle lateral force is mainly affected by the wheel/rail lateral force and also related to the force transferred from the bogie to the axle. The analysis results show that the variation law of axle lateral force is similar to that of wheel/rail lateral force.

5.4. Wear Index

Elkins’s wear index is calculated by summing the scalar products of creep force and creepage on all contact patches.

Figure 15 depicts the wear index for different degrees of WPW coupled with different WDDs.

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Figure 15 

Wear index. (a) Inner wheel (right wheel). (b) Outer wheel (left wheel).

The following can be seen from Figure 15:(1)The wear index of both the left and right wheels increased with increasing degree of WPW. The outer (left) wheels had a greater wear index, and the peak wear index was about 1.99 times that of the inner wheels. Table 10 shows the increase in wear index of the outer wheels due to profile change from S1 to S3 for different WDDs (−1, −0.8, −0.5, −0.2, 0, 0.2, 0.5, 0.8, and 1 mm).(2)When the larger-diameter wheels were on the outer side (i.e., WDD > 0), the wear index was relatively low, indicating that the resistance to wheel wear can be improved by positioning larger-diameter wheels on the outer side. When the larger-diameter wheels were on the inner side (i.e., WDD < 0), the wear index was relatively high. In the case where a −1 mm WDD was coupled with worn wheel profile S3, the wear index reached up to 356.78 N, indicating extremely severe wheel/rail wear.

As the degree of WPW increased, the wheel/rail interaction deteriorated and wheel/rail wear increased. When the inner wheels had a larger diameter than the outer wheels, the yaw angle and lateral creepage of the wheelset increased with increasing WDD and wheel/rail wear increased under the combined action of centrifugal forces.

6. Conclusions

Wheel profile wear and equivalent in-phase wheel diameter difference coexist on the studied subway line. This study investigated the influence of WPW coupled with WDD on vehicle dynamics, compared the dynamic responses of outer and inner wheels, and then analyzed the vehicle’s dynamic performance for different positions of the larger-diameter wheels. The study can lead to the following conclusions:(1)The dynamic performance of the vehicle during running on a straight line can be characterized as follows:(i)In the presence of WPW coupled with WDD, the vehicle’s ride comfort index decreased as the absolute value of WDD increased. This suggests that WDD can slow down the deterioration of ride comfort index caused by increasing WPW and improve the vehicle’s ride comfort to some extent. However, the coupled damage reduced the critical speed and undermined hunting stability. The critical speed for the worn wheel profile for 14 × 10⁴ km was lower than the maximum allowable speed for running on a straight line (100 km/h) when WDD was −1, −0.8, 0.8, and 1 mm.(ii)Whether the larger-diameter wheels are on the inner side or outer side had little influence on the vehicle’s critical speed and ride comfort index.(2)The curve negotiation performance of the vehicle has the following characteristics:(i)In the presence of WPW coupled with WDD, the vehicle showed increases in the lateral wheel/rail contact force, derailment coefficient, axle lateral force, and wear index and deterioration of curve negotiation performance when the larger-diameter wheels were on the inner side. When the larger-diameter wheels were on the outer side, the lateral wheel/rail contact force, derailment coefficient, axle lateral force, and wear index declined, indicating that the coupled damage can improve the vehicle’s dynamic performance if the outer wheel diameter is larger than inner wheel diameter.(ii)In the presence of WPW coupled with WDD, the outer wheels had significantly greater lateral wheel/rail contact force, derailment coefficient, and wear index compared to the inner wheels, and their peak values were 1.67, 1.91, and 1.99 times greater, respectively, than those on the inner side.(iii)When the worn wheel profile for 14 × 10⁴ kilometers traveled was coupled with -1 mm WDD, the peak lateral wheel/rail contact force and peak axle lateral force on the outer side reached up to 38.74 kN and 37.51 kN, respectively, which are close to corresponding safety limits. The peak derailment coefficient was 0.84, higher than the safety limit of 0.8. The wear index was as high as 356.78 N, indicating that the wheels were badly worn.(3)During the maintenance of subway vehicles, the maintenance personnel should check the coupling of different types of wheel damage in addition to wheel damage detection. Moreover, special attention should be paid to the curve negotiation performance of outer wheels when the inner wheels have greater diameters than outer wheels. After the distance traveled reaches 14 × 10⁴ km, the personnel should check whether the lateral wheel/rail contact force, derailment coefficient, and axle lateral force exceed the safety limits.

Data Availability

The data used to support the findings of this study are available from the first author upon request.

Conflicts of Interest

The authors declare that there are no conflicts of interest regarding the publication of this paper.

Acknowledgments

This research was funded by the National Natural Science Foundation of China (Grant no. 51975038).