Influence of the shutdown process of the driveline on the generator bearing life in the diesel generator set

Diesel generator sets are commonly used as power sources in transportation due to their versatility and cost-effectiveness. During the shutdown process, the diesel engine’s cylinder compression pressure would cause forced vibration in the driveline system through the crank linkage mechanism, resulting in unsteady loads that pose a threat to the bearing life. To address this issue, a coupling forward design method is proposed that takes into account the impact of unsteady loads on bearing life. An experiment was conducted on a 16V280 diesel generator set shutdown process, and a driveline dynamic model was established. The cumulative damage value that connects unsteady loads and bearing life was introduced to quantify the effect of unsteady loads on the bearing life during the shutdown process. The unsteady loads included torque fluctuation and collision forces. The results showed that reducing the driveline key gap and increasing the coupling stiffness can decrease the combined load on bearings and improve bearing life. A large stiffness coupling was designed to achieve shutdown smoothness and a 43.19% reduction in bearing life damage, confirming the design method’s feasibility concerning bearing life.


Introduction
A diesel generator set is a compact and portable power system that finds widespread application in various industries, including railway vehicles, ships, and other fields. 1 During diesel engine shutdown, the combination of unbalanced cylinder compression pressure and reciprocating inertia forces from the piston results in speed fluctuations. 2 Excitations from the diesel engine are transmitted to the generator through an elastic coupling, where it is common to change stiffness and damping parameters to adjust the amplitude and frequency for better vibration damping. However, this method would generate strong resonance and amplified torque fluctuations when drivelines pass through the critical speed during startup or shutdown processes. [3][4][5][6][7][8][9] Moreover, the coupling in the driveline is commonly connected to the generator shaft through a key, which compensates for deviations due to inaccurate manufacturing and installation, deformation, and thermal expansion during operation. The presence of the key and fit tolerance gap also leads to continuous collision accompanied by torque fluctuation in the transmission process. 10,11 The complex load during the shutdown, which includes amplified torque fluctuations and collision forces, significantly reduces bearing life. A novel design approach is needed to address this issue.
Couplings in the driveline were selected and designed to meet the torque transmission requirements and to achieve vibration damping by adjusting their stiffness and damping parameters to avoid operating at critical speeds. 12 The main parameters of the driveline system were determined, then the primary vibration modes were analyzed by a dynamic model and the stress-strain characteristics of the shaft system were evaluated. 13 However, the design process did not account for the load on the bearing at critical speed, which has a significant impact on reducing bearing life. Current research on bearing life primarily focuses on data-driven life prediction 14,15 and prediction based on fatigue theory. The former studies belong to online fault diagnosis and are not suitable for the forward design of the driveline system. The latter studies, based on the Lundberg-Palmgren (L-P) life model, 16 employ a classical fatigue life prediction theory that uses metal fatigue probabilities following a Weibull distribution. To account for the impact of lubrication characteristics on frictional forces and reliability, a correction method with a correction factor for bearing fatigue life was proposed. 17,18 This method has been successfully applied to evaluate and calculate bearing life for specific loads at different speeds in engineering practice. 19 However, this method is only suitable for predicting bearing life under steadystate conditions. Further research is needed to develop a method that can quantify bearing life, especially when considering the impact of the shutdown process.
The shutdown process of diesel generator sets has the following characteristics: (a) The shutdown process has torque fluctuations and is a forced vibration process. (b) The shutdown process at critical speed would amplify the torque fluctuations and produce collisions. The bearing life is influenced by the load, with harsh load conditions having the potential to significantly reduce its longevity. The design of coupling parameters plays a crucial role in determining the load on the bearing during critical speeds, and as such, must be considered to ensure the longevity of the bearing. To address this design challenge, the following steps must be undertaken: (1) To establish a correlation between the driveline system dynamic model and bearing loads. (2) To conduct a quantitative study on the evaluation method of bearing life during the shutdown process. (3) To develop a coupling design method for diesel generator sets that take into account the bearing life.
In this study, a systematic method for evaluating the bearing life of a diesel generator set during its shutdown process is presented. The study is organized as follows: firstly, a diesel generator set shutdown process was used as an experimental case to analyze the significance of unsteady vibration generated during the shutdown process on bearing life and the driveline dynamic model was constructed. Then, the correlation between bearing loads and the established driveline dynamic model was established. After that, an evaluation method for quantifying the bearing life was proposed during the shutdown process. Finally, a new coupling design is executed to validate the feasibility of considering bearing life in the coupling design method.

Problem formulation
During the shutdown process of the diesel generator set, the diesel engine's cylinder compression pressure would drive the flywheel and the coupling to rotate through the crank linkage mechanism. The generator input shaft was connected to the driven part of the coupling through a flat key, and the presence of a key gap could lead to collisions during operation. This study utilized a shutdown process of a 16V280 diesel generator set as a case study, and a schematic representation of the measurement points and power transmission is depicted in Figure 1. A magnetoelectric sensor was positioned on the flywheel of the diesel engine to monitor the torsional vibration behavior of the transmission shaft, and a three-axis piezoelectric accelerometer was placed on the generator's bearing seat to measure the vibration response synchronously. The parameters of the components used in the experimental bench are presented in Table 1.
The Dynamic Signal Test and Analysis System was utilized to analyze the rotational speed signal of the flywheel and the vibration signal on the bearing seat, as shown in Figure 2. The data depicted in Figure 2(a) showcased that during the shutdown process, torque fluctuations were magnified as the critical speed was crossed, leading to substantial fluctuations in rotational speed. The vibration signal on the bearing seat simultaneously produced a larger amplitude, as shown in Figure 2(b), indicating that the driveline amplified torque fluctuations and generated collisions as it passed through the natural frequency of the driveline. The excitation was transmitted from the generator input shaft to the bearing seat, resulting in the stimulation of synchronous vibration. The unfavorable load on the bearing during the shutdown process is expected to reduce its service life.

Bearing life analysis method during shutdown processes
The experiments illustrated that when the driveline system passed through the critical speed during the shutdown process, significant vibration was generated in the bearing seat due to the poor load conditions on the bearing. This highlights the importance of considering the impact of the shutdown process on the bearing life.
This section endeavors to quantitatively evaluate the bearing life during a shutdown process by establishing a correlation between the driveline and bearing loads, with the ultimate goal of predicting the impact of the shutdown process on bearing life.

Modeling the driveline system
The driveline dynamic model should represent the main moment of inertia, the stiffness and damping of the connection between the main components and the main characteristics of the gap in the driveline system. 7   Therefore, the article adopts four assumptions: (a) Centralized inertia assumptions: The model assumes that components with larger and more concentrated inertia are considered as inelastic inertia components, while components with smaller and dispersed inertia are regarded as inertia-free components. In the diesel engine shaft system, the moment of inertia of the moving components, including the piston-rod, and crankshaft, in each cylinder is simplified as the concentrated inertia at the center of each crank. Following the principle of energy equivalence, the moment of inertia of the driveline model includes the diesel engine shaft system with flywheel and driving part of the coupling (J 1 ), driven part of the coupling (J 2 ), and generator rotor shaft system (J 3 ). (b) Stiffness linearization assumption: The assumption of the stiffness linearization is that the deformation of elastic elements is small, and nonlinear characteristics of materials and geometric nonlinearities are neglected. Therefore, all elastic elements are treated as linear. The dynamic stiffness of the coupling is simplified as k dyn . (c) Damping linearization assumption: In a vibration system, the vibration velocity decreases gradually due to external effects on energy dissipation by damping elements, such as lubricating oil resistance, and inter-structural friction. It is approximated that this damping force is proportional to the velocity, considering the viscosity of the medium. The dynamic damping of the coupling is simplified as c dyn , and the damping of the resistance moment on the diesel engine's crankshaft system is simplified as c t . (d) Newtonian collision model assumption: It is generally believed that only elastic deformation occurs during the collision process, while plastic deformation can be ignored. 5 Therefore, the Newtonian collision model is used, neglecting energy losses. The process of transmitting force through the collision of the flat key in the driveline system is expressed by using the Newtonian collision model. In driveline system, the flat key is mounted on the generator shaft with a radius r. The torque fluctuation is transmitted by the transmission force F c . According to Newton's second law of motion, a 3-DOF driveline system dynamic model could be constructed to express main characteristics of dynamics at time t during the shutdown process. Schematic diagram of the 3-DOF driveline model is shown in Figure 3, and the dynamic model is represented as where u 1 , u 2 , and u 3 are denoted as the angular displacement of three different inertias. The input fluctuation torque T e is considered the main excitation source, with only the 4.0 harmonic and the 8.0 harmonic being taken into account, and the generator running resistance torque, The generator running resistance torque T d is also considered. A detailed presentation of T e and T d could be found in the literature. 8 The tested 16V280 diesel generator set was simplified by three moments of inertia, J 1 = 177.65, J 2 = 2.26, J 3 = 602.60 kg/m 2 , and a radius of r = 100 mm. The flywheel resistance damping coefficient c t plays a crucial role in providing the driveline system with a resistance moment. The resistance moment and the excitation act together on the inertia J 1 in the shutdown process. The deceleration slope € u 1 of each moment is obtained by the torsional vibration test results of the flywheel. There is the Geislinger coupling connection between J 1 and J 2 , the dynamic stiffness k dyn and dynamic damping c dyn of this coupling are dependent on the phase velocity of vibration v, and exhibit piecewise linear properties 12 : where the characteristic frequency of the coupling v 0 was determined to be 290 rad/s. The transmission force, F c , acting on the flat key could be expressed as where the flat key gap F was determined to be 0.28 mm. The viscous drag force generated by the lubricating oil in the gap of the key, damping coefficient is c = 100 NÁmÁs/ rad, collision stiffness is k g = 1,000,000 MÁNÁm/rad. 20 The relationship between the transmission force F c and the gap F obtained from equation (2) could not be used directly for numerical calculation in the time domain. It is known that the numerical time integration is time-consuming and may encounter numerical illconditioning and ''stiffness'' issues due to the extremely strong collision nonlinearity. 21 To mitigate these issues, a hyperbolic tangent function, y = tanh(sÁd), is introduced to smooth the nonlinear collision process in the original model. 21 The smoothing factor (s) is chosen to be 1000 in this study. The transmission force generated by the key could be expressed A reasonable model should be able to reflect accurately depict the fluctuations in amplitude and frequency when passing through the critical speed. 3 The shutdown process has taken 12 s and the fluctuation speed was amplified in the test. The classic fourth-order Runge-Kutta method 5 could be adopted to calculate the dynamic response of the control equation (1). The Detrended Fluctuation Analysis (DFA) 22 was applied to analyze the deceleration curve depicted in Figure  2(a) for both the test and the 3-DOF model. The fluctuation values at resonance for the test and simulation are displayed in Figure 4(a) and (b) respectively. As depicted in Figure 4, the number of fluctuations generated at resonance is equivalent between the test and the simulation. The comparison between the test and the simulation can be seen in Table 2, with the maximum error being 0.66%. This error demonstrates that the 3-DOF model accurately captures the dynamic properties of the system during the shutdown process.

Combined load on the bearing
The driven part of the coupling is connected to the input shaft of the generator via a flat key. The generator is equipped with two NU2326 cylindrical roller bearings for stability. The rotor has been integrated into the generator shaft and is connected to both the bearing seat and the stator through two bearings, as illustrated in Figure 5(a). According to the static balance of theoretical mechanics, the rotational loads F r1 and F r2 on the generator Bearings 1 and 2 are  The static loads G 1 and G 2 of Bearing 1 and Bearing 2 are where the transmission force F c could be calculated by utilizing equation (1). The distance between the driven part of the coupling and Bearing 1 is l 1 = 230 mm, and the distances between bearings and the center of gravity of the generator are l 2 = l 3 = 460 mm. The mass of the rotor and bearing inner ring assembly part is integrated into the input shaft of the generator, and its gravity G as a static load is determined to be 25,436.76 N. It is assumed that at the start of the calculation, the rotational load F rk (k = 1, 2) and the static load G k are in the same direction b(0) = 0°. As the rotational speed decreases, the angle b(t) between the two loads changes over time t. Figure 5(b) shows the combined load on the bearing in both situations where the rotational load is greater than the static load and where the reverse is true. the combined load F lk (t) on the bearing is obtained by summarizing the two situations. Since the axial force of the shafting is mainly absorbed by the coupling, the equivalent dynamic load P li (t) on the bearing is equal to the combined load F lk (t), after ignoring the axial force, that is The transmission force F c on the flat key is solved by the control equation (1), and the correlation between the driveline dynamic model and the combined load on the bearing is established by equations (4)- (6).

Bearing life prediction
The alternating combined load endured by the bearing has a direct impact on its life. The S-N curve of the material used in the NU2326 bearing provides information regarding the relationship between the contact stress and the life of the bearing. When the contact stress is below a certain value, the theoretical life of the material is considered infinite and can be ignored for practical applications. The relationship 23 between the combined load and the contact stress of the NU2326 bearing is where the GCr15 bearing steel is manufactured using GCr15 bearing steel, with a minimum contact stress (S i min ) of 800 MPa. 24 The coefficient K 1 is equal to 3.62.
The basic rating life of the bearing L 10 is expressed as where the basic dynamic load rating is C r = 920,000 N. Bearing life at different speeds n is also related to lubrication characteristics. 25 The lubrication characteristics are described by the viscosity ratio, k. k is where the efficacy of lubricants is primarily determined by the separation level of the rolling contact surfaces, The generator bearing is generally clean grease lubrication. When other impurities are mixed in the lubricant, the contamination coefficient e c is obtained. It is related to the pitch diameter D pw of the bearing. Its contamination coefficient e c is e c = 0:0432k 0:68 D 0:55 Based on equations (9) and (10), the change in bearing lubrication parameters during the shutdown is calculated and depicted in Figure 9. The results highlight that the bearing lubrication condition is not favorable at low speeds, as the viscosity is relatively small and the viscosity ratio increases with increasing rotating speed. As the speed increases, the lubrication state becomes more advantageous, and the ideal lubrication state is achieved at the maximum speed. However, it should be noted that exceeding the operating speed may cause the bearing temperature to rise, leading to a reduction in actual kinematic viscosity and viscosity ratio. Equation (10) further demonstrates that the contamination coefficient is positively correlated with the viscosity ratio, hence it exhibits the same trend as the viscosity ratio during shutdown, as shown in Figure 6(b).
The bearing life correction factor a ISO incorporates several parameters. The viscosity ratio k considers the operating temperature of the bearing and its impact on lubricant type, viscosity, rotation speed, and additives. The contamination factor e c takes into account the level of cleanliness in the lubricant and the influence of contaminant particles. The fatigue limit C u considers various factors such as the bearing type, size, and internal geometry, as well as the contour shape of the rolling element and raceway, the machining quality, and the fatigue limit of the material. The fatigue limit of a roller bearing can be determined by using the bearing dynamics method 26 or the approximate estimation method. 23 Once these parameters are determined, the life correction factor of the bearing can be obtained 27 and be expressed as follows where the basic static load rating of the roller bearing is C 0 = 1,230,000 N, and its pitch circle diameter is D pw = 205 mm. The fatigue limit C u of the roller bearing is presented as follows The adjusted rating life of the bearing, incorporating the effects of lubrication characteristics and reliability factors, is described below when the reliability is 99%, the reliability life correction coefficient is a 1 = 0.25.
The bearing life at each speed could be calculated using equation (12). However, quantifying the effect of the whole shutdown process of the diesel generator set on the bearing's life is a challenging task. Based on Palmgren-Miner's linear damage theory, the fatigue damage is linearly related to the number of rotations, and the fatigue damage could be linearly superimposed. When the cumulative damage D reaches a threshold value, fatigue and damage will occur. To evaluate the impact of the shutdown process on the bearing life, cumulative damage (D) is employed as an indicator. According to the rotational speed n, the actual number of turns of the inner bearing at the time of Dt could be calculated as follows The present study calculated a total of 120,000 data points during the shutdown of 12 s, which were divided into 120,000 segments. By utilizing equation (12), the number of rotations of the inner bearing and the adjusted rating life of the bearing was determined for each segment. The resulting calculation provided an estimation of the cumulative damage D incurred by the diesel generator set during the shutdown process.
where the required parameters are represented as discrete data, l pj could be calculated utilizing equation (13) and L pj could be depicted via equation (12), with j representing the segment number in the calculation. Palmgren-Miner's linear cumulative damage criterion holds that the damage level of the inner and outer rings subjected to the rolling load increases incrementally as the number of rotations increases.
The combination of loads experienced by Bearing 1 and Bearing 2, F l1 and F l2 , could be calculated using equation (6). The variation of combined loads of Bearing 1 and Bearing 2 is shown in Figure 7. It can be observed that if the combined load F li \ F li min , the influence on its life could be neglected. From the figure, it is evident that the shutdown process affects the life of Bearing 1, but not that of Bearing 2. Thus, a detailed analysis of the life of Bearing 1 with the most intense loads is necessary.
The changes of a ISO , L 10 , and L p during the shutdown process are shown in Figure 8. As observed, the values of a ISO and L p exhibit a clear decreasing trend during Stage I and Stage II, which is attributed to the fact that the lubrication of the bearings becomes less favorable at lower speeds. When there is manufacturing error in the bearing, the values of the fatigue limit C u and the bearing life correction factor a ISO of the roller bearing will be decreased. These factors can all reduce the bearing life.
In Stage I, it is noteworthy that the adjusted rating life L p decreases dramatically, a result of the decrease in both a ISO and L 10 . The root cause of this decrease is not only due to unfavorable lubrication, but also the triggering of the torsional resonant modal of the diesel generator set's driveline at 100-140 rpm. This triggers the amplification of the fluctuating torque and transmission force F c , which, as indicated by equations (4)- (6), increases the combined load on the bearings, leading to a substantial decrease in the values of a ISO and L 10 .

Relationship between the driveline model and the bearing life
According to the above discussion, the bearing life is affected by many factors such as lubrication characteristics, manufacturing errors, geometry, material properties and so on, and the parameters of the coupling play a crucial role in determining the level of speed fluctuation and the combined load on the bearings. This research establishes a correlation between the bearing life and the dynamic response of the driveline system, and provide a theoretical support. This section considers the feasibility and reliability of operation in practice, it can be difficult to alter the mass and moment of inertia parameters of the diesel generator set's driveline. And the gap and torsional stiffness of the coupling can be adjusted conveniently in the design. And this section will discuss the effect of these parameters on the bearing life.

Influence of the coupling torsional stiffness
The required torque determines the torsional stiffness multiplier, which could vary from 0.5 to 2. The damping parameters of the Geislinger coupling are proportional to the stiffness parameters, meaning that the damping could be derived from the stiffness parameters. The influence of the coupling's torsional stiffness on the bearing damage is illustrated in Figure 9(a), which displays a substantial variation in the bearing damage value as the coupling stiffness changes. The figure illustrates that reducing the torsional stiffness of the coupling to 0.5 times its original value results in a 90.21% increase in the damage value.
The life of the bearing could be reduced and the damage value D could be increased when the bearing is operating under a larger load according to equations (12)- (14). Therefore, it is necessary to analyze the combined load on the bearing. The static load is the constant force of gravity, hence the combined load is directly proportional to the transmission force F c , as indicated by equations (4)- (6). The transmission force is a critical factor in determining the damage value D. The DFA method was employed to extract the collision force for separate analysis, and the transmission force and the collision force are shown in Figure 9(b). The decrease of the coupling torsional stiffness from the original value significantly contributes to the increase in the absolute value of the transmission force F c and the collision force, resulting in a significant increase in the bearing damage value D. Conversely, a slight increase in torsional stiffness from the original value decreases these forces.
When the coupling stiffness is reduced to 0.5 times its original value, the system experiences the rebound caused by the excessive softness of the coupling during a collision. During this rebound, the high-order vibration modes of the diesel engine, flywheel, and the driving and driven parts of the coupling are excited, leading to a significant deterioration of the torsional vibration of the system. 8 This causes a significant increase in the damage value of the bearing. Therefore, designers must exercise caution and ensure that the torsional stiffness of the coupling is not too low when determining the parameters of the driveline.

The influence of key gap
The driven part of the Geislinger coupling in the diesel generator set is connected to the generator input shaft via a key, which compensates for axial movement. The key gap is selected according to industry standards, with a maximum tolerance of 0.3 mm and an original gap of 0.28 mm in the driveline. A splined connection with a minimum tolerance of 0.01 mm. If the gap is 0 mm, the driveline is tightly matched. The cases are listed in Table 3. The effect of the key gap on the bearing damage was investigated while keeping the coupling stiffness and damping parameters constant. As shown in Figure  10(a), an increase in the gap leads to a linear increase in the damage value of the bearing. This can be attributed to the transmission force F c , which determines the combined load. Figure 10(b) show the peak-to-peak value of the transmission force F c and the collision force, extracted using DFA, under various gaps. The increase of the gap slightly raises the peak-to-peak value of the transmission force (F c ), and the collision force as the component in the transmission force rises remarkably. Conversely, reducing the gap could effectively reduce the collision force, as a decrease in the gap leads to fewer collisions in a fluctuation cycle. In theory, if the driveline were designed to be tightly fitted, there would be no collision force due to the absence of a gap. However, a gap of 0.3 mm would increase the damage value of the bearing by 19.68% at most compared to a tight-fit design. These results suggest that the gap primarily affects the magnitude of the collision force, which in turn raises the damage value of the bearing and decreases its life.

Design method of the coupling considering the bearing life
The analysis in Section 4 demonstrates that a reduction in the key gap primarily reduces the damage to the bearing by mitigating the collision force. Furthermore, enhancing the torsional stiffness of the coupling can simultaneously decrease the peak transmission force, collision force, and damage value of the bearing, contributing to extended bearing life. However, an increase in the stiffness could lead to a rise in the natural frequency of the driveline of the diesel generator set, potentially compromising stability during idle and other operating conditions.
In this section, a method for designing the stiffness of a coupling while taking into account the life of the bearing is put forward. The design flow is outlined in Figure 11.
Step 1: Determining Available Elastic Coupling Types To begin, the types of elastic couplings should be determined, based on the torque transmission requirements of the diesel generator set.
Step 2: Vibration Isolation Theory Next, the design follows the principles of passive vibration isolation and aims to achieve a preliminary vibration isolation effect by ensuring that the ratio of excitation frequency to the natural frequency of the driveline is greater than ffiffi ffi 2 p . Increasing the ratio is more beneficial to the performance of the driveline. Then the elastic coupling parameters are put into the driveline dynamic model to determine.
Step 3: Calculating the Combined Load of the Bearing If the above requirements are met, the elastic coupling parameters would be entered into the driveline dynamic model and the combined load of the bearing  would be calculated using equation (6). As the static load is constant due to gravity, equations (4)- (6) show that the combined load is directly dependent on the transmission force F c . The goal is to ensure that all transmission forces F c are lower than F cmin . To achieve this, the design search for different elastic coupling stiffness values until this target is met and determine the final coupling stiffness.
Step 4: High-Stiffness Coupling Plan If the elastic coupling design fails to meet the requirements in Step 3, the design needs to consider a new high-stiffness coupling plan. The design specifies the frequency range under the main harmonic excitation based on the main working speed range of the diesel generator set and repeats Steps 2 and 3 for the lowest coupling stiffness. The final coupling stiffness parameter should meet the requirement of F c \ F cmin .
Step 5: Minimizing the Key Gap Finally, while maintaining the above criteria, the key gap should be minimized as much as possible.
The design of the coupling stiffness for a diesel generator set was carried out according to the method described above. The minimum transmission force F cmin of the bearing, as determined by equations (4)- (6), was calculated to be 48,838.56 N, with a corresponding permissible peak value of 36,120.18 N.
However, the simplified 3-DOF model indicated that the elastic coupling scheme could not guarantee that the peak value of F c would be less than 36,120.18 N, leading to the introduction of a high-stiffness coupling. The maximum speed of the diesel generator set was 1000 rpm, resulting in an 8.0 harmonic frequency of 133.33 Hz, and the natural frequency of the driveline was required to be greater than 188.56 Hz.
The design of the coupling took into account the actual production requirements, considering the maximum torque transmission, rotational speed, dimensions, as well as the stiffness and damping parameters determined based on the above design method. A tightfit high-stiffness coupling was designed and produced in accordance with the quality assurance requirements of ISO 4863:1984, as depicted in Figure 12. This design eliminated the key and gap, and the axial movement was supplemented by a diaphragm spring. This coupling was employed to connect the input shaft of the generator, From the calculation of numerical results as shown in Figure 13(a), it indicates that the driveline equipped with this coupling could effectively avoid torsional vibration resonance and collisions during the shutdown process. The maximum peak value was determined to be 33,926.07 N, which was smaller than F cmin . The damage value D of the diesel generator set was calculated to be 0.0023, a decrease of 43.19%, thereby significantly improving the bearing life.
From the torsional vibration test results as shown in Figure 13(b), the speed fluctuation at the flywheel was a stable and non-resonant during the shutdown process, making it favorable for long-term bearing operation.

Conclusion
(1) During the shutdown process of the diesel generator set with an elastic coupling, it has been  observed that transmission forces and collision forces generated by the key could be amplified, when the excitation frequency approached the driveline natural frequency. The amplified forces could significantly increase the combined load on the bearing and reduce the bearing life.

Declaration of conflicting interests
The author(s) declared no potential conflicts of interest with respect to the research, authorship, and/or publication of this article.