Analysis of a geared system under dynamic conditions is an essential step in its design to satisfy the specific requirements given as noise, vibration, and durability performance (fatigue life) point of view. For powered transmissions or gear boxes, the dynamic gear mesh forces created by gear contacts fluctuate and are transmitted to the housing of the gear box through supporting structures such as shafts and bearings. This transmitted high mesh frequency (tooth-passing frequency) gear mesh force excites the gear box of the radiating surfaces, causing larger structure-borne vibrations and gear whine noise, and eventually reduces the fatigue life of the shafts, bearings, and gears. In this regard, the noise, vibration, and durability performances of the geared system are dictated by the characteristics of the dynamic gear mesh forces.

In this study, the dynamic behavior of a spur gear pair is focused on since spur gear systems are widely used in many areas, such as marine applications, heavy machinery, and agricultural machines, and so on. For example, in marine applications, spur gears are utilized in marine turning gear boxes in the form of spur planetary gear sets as the main auxiliary machine enabling the disassembly and maintenance of the engine [1], to reduction gear boxes connected to marine propulsion systems, etc. In particular, the dynamic characteristics of the reduction gear box become a more important issue since the gear box is excited by the torsional mode of the propeller shafts, causing vibrations to the overall system and reducing the fatigue life [2]. Therefore, investigating the dynamic behavior of spur gear pairs is essential to evaluate a system in terms of noise and vibration as well as to solve the potential dynamic problems of the system.

In many fields, helical gear systems are also broadly used since they exhibit relatively lower vibratory motions than spur gears [3]; however, helical gear systems require very complicated structures in their designs. The structure of a helical gear system has to be much stiffer since the bearings should be sufficiently larger to support the axial thrust at the helical gear mesh induced by the helix angle, and the shafts have to be larger to react to the tilting moment as well [4]. For these reasons, spur gears are easily utilized in many applications with relatively simple structures and cost benefits. However, spur gear pairs often exhibit a large amount of gear vibratory motion, accompanied by a strong nonlinear phenomenon. Therefore, in this study, the non-linear dynamic behavior of spur gears was investigated by implementing an accelerometer-based measurement method under realistic operating conditions to aid designers to guide them for more desirable dynamic behaviors at a certain stage of system development.

One of the main excitations causing torsional gear vibrations is the transmission error (TE) in the gear mesh, which is defined as “the difference between the actual position of the output gear and the position it would occupy if the gear drive were perfectly conjugate” [5].

With this definition of TE, it is defined as TEt=rgθgt+rpθpt along the line of action, where subscripts p and g denote the pinion and gear, respectively, and r and θ represent the base radius and angular displacement, respectively, as shown in Figure 1. TE is a periodic function with the gear mesh frequency (equal to the fundamental frequency). Under dynamic conditions, this excitation TE is significantly amplified at and near the resonances of the dynamic system, resulting in a large number of transmission errors. This is called the dynamic transmission error (DTE) [6], which causes large dynamic stresses and loads, which potentially reduce the fatigue life of the gears and bearings.

Figure 1: 
A schematic of gears representing the line-of-action and the pitch and base circles

Over the years, experimental and theoretical investigations regarding TE have been conducted with significant attention in gear design fields. Munro [7] measured static TE under unloaded and loaded conditions using an optical grating with a single-flank test machine at lower speeds. In references [8] and [9], TE was measured by using optical encoders attached at the end of the shafts of the gears under quasi-static operating conditions (very lower gear speeds). The above studies reveal speed limitations (typically less than 50 rpm) in measuring TE, indicating that the previously used measurement methods cannot capture the dynamic characteristics of a gear pair under higher speed conditions. Hayashi [10] used the reaction torque between the gear mass and a large inertial mass to compute the dynamic load from which the DTE could be deduced. This method was able to measure the DTE under any rotational speed, but the accuracy was lower than that of the accelerometer measurement method. Tordion and Gerardin [11] measured DTE using linear accelerometers mounted on the pinion and gear at a certain radius. It should be noted that most of the data analysis for implementing this method was done using analog circuitry.

The main objective of this study is to propose and employ an accelerometer-based measurement method in conjunction with digital signal processing (DSP) to account for the dynamic behavior of a spur gear pair under sufficiently high-speed conditions.

In this section, the measured steady-state DTE responses are presented as a function of the gear rotational speeds under various torque levels.

As shown in Figure 7, the DTE amplitudes were measured for both speed-up (upward speed sweep) and speed-down (downward speed sweep) phases to capture nonlinear behavior due to tooth separation (loose gear contact). The solid circles represent the DTE amplitudes measured under the speed-up condition (500 to 4200 rpm), and the hollow circles were obtained under the speed-down condition (4200 to 500 rpm) at a torque level of 100 Nm. The response curves (speed-up and speed-down) were quite similar in their amplitudes for most of the entire speed range, indicating where dynamic responses are considered linear. In other words, tooth separation did not take place at most of the speed ranges except in the region of the resonance at around 2800 rpm. In Figure 7, the jump discontinuity phenomenon is observed at the resonance. During the speed-up phase, the DTE amplitude suddenly jumped up at 2800 rpm, while the DTE amplitude jumped down at 2400 rpm in the speed-down phase. Moreover, the DTE amplitudes for the upward sweep test continued to climb up to 15 mμin contrast to the jump-up values. A similar discontinuity can be observed at several resonance peaks, 1500, 1900, and 3800 rpm, as well, but their scales were much smaller. This discontinuity indicates that a double (distinct) stable motion existed in the speed range of 2400 to 2800 rpm. As seen in Figure 7, the double stable region had a lower stable branch and upper stable branch. The lower branch could be measured only when approached from the lower speed (rpm) side, while the upper branch could be achieved only from the higher speed side. This nonlinear behavior resulted from tooth separation at the gear mesh. As a result, tooth separation led to a significant reduction in gear mesh stiffness values. In this context, it is called a softening-type nonlinear behavior for a spur gear pair.

Figure 7: 
The measured DTE responses at torque of 100 Nm

Similarly, Figure 8 shows the steady-state DTE response at a torque level of 200 Nm for both the speed-up and speed-down phases as well. The DTE response curves show resonance peaks over the entire speed range. First, resonance peaks were observed at 3100, 1550, and 1050 rpm (corresponding to 2583, 1291, and 861 Hz). These three resonance peaks were associated with the same natural mode (or natural frequency). The resonance peak at 3100 rpm (denoted by A1)was excited by the first (or fundamental) harmonic of the TE excitation. Referring to the definition of TE in the previous section, TE is a periodic function as toothpassing frequency and can be expressed by the summation of harmonic orders using FFT. In this context, the peak at 3100 rpm is called the primary resonance since it was excited by the first harmonic of the TE. The resonance peak at 1550 rpm also corresponded to the first super-harmonic resonance excited by the second harmonic of the TE, denoted by A2. Finally, the second super-harmonic resonance peak at 1050 rpm was excited by the third harmonic of the TE as well, denoted by A3. In the same manner, the resonance peaks at 3900, 1950, and 1300 rpm (corresponding to 3250, 2333, and 1083 Hz) were related to another same natural mode, as shown in Figure 8. Therefore, the two different natural modes mostly dominated the DTE responses within the rotational speed range. Figure 9 shows the steady-state DTE response at a torque level of 300 Nm. The same observations mentioned previously can be made. It is noted that the peak at 3300 rpm exhibited a distinct jump discontinuity, while the peaks at around 4200 rpm did not. This implies that the excited natural mode at 3300 rpm was more torsional than the other excited natural mode at 4200 rpm.

Figure 8: 
The measured DTE responses at torque of 200 Nm

Figure 9: 
The measured DTE responses at torque of 300 Nm

Figure 10 shows the DTE responses at torque levels of 100, 200, and 300 Nm to observe the effects of the different torque levels on the forced steady-state responses. The speed-up and speed-down phases were plotted on a curve for each torque level. The double stable regions were slightly widened, and the amplitudes of the resonance peaks increased significantly as the applied torque increased. Moreover, the natural frequency increased at an increased torque value. This is also a nonlinear behavior typically observed in gear dynamics. This is because the gear mesh stiffness increases due to the widened contact area (Hertzian contact) with higher torques, increasing the natural frequencies.

Figure 10: 
The measured DTE responses at torques of 100, 200, and 300 Nm

In this study, an accelerometer-based measurement system was employed to investigate the dynamic behavior of a spur gear pair. In this method, a set of uniaxial accelerometers were mounted on each flange of each shaft next to a gear at a certain radius, and a data processing scheme was used to process the data from the uniaxial accelerometers to obtain torsional vibration and then to calculate the dynamic transmission error of a gear pair. This measurement method was applied to a spur-gear pair. The measured data show that dynamic transmission errors were measured quite effectively by implementing the accelerometer-based measurement system proposed in this study. The steady-state DTE responses show that the jump discontinuities during speed-up and speed-down phases obviously occurred at the primary and super-harmonic resonances, indicating that this softening-type nonlinear behavior is an inherent characteristic of spur gear pairs under dynamic conditions. In addition, this nonlinear behavior became more significant at higher torque levels. Based on this study, nonlinearity should be taken into account in the design stage of spur gear systems. If gear systems operate near the primary or super harmonic resonances, the corresponding harmonic magnitude of TE excitation should be minimized by applying tooth modifications to gears. Therefore, the DTE amplitudes and nonlinearity can be minimized.

The method proposed in this study is not suitable for measuring DTE responses at a lower speed range. Thus, no DTE results were presented at speeds below 500 rpm since the double integration of the acceleration signals elevates the noise floor significantly at such low-speed ranges. If a gear system has resonances at that lower speed, this measurement method cannot capture the DTE responses well. In order to fill this gap, an encoder-based measurement method for a lower speed range can be combined with this accelerometer measurement method.

All the tests performed in this study used unmodified (purely involute) gears at a given contact ratio. Additional tests can be performed to determine the impact of modified tooth profiles on the dynamics of gear pairs. Also, the proposed measurement system can be modified to measure the DTE of cross-axis gears such as bevel and hypoid gears.