Abstract

Amplitude demodulation is a key for diagnosing bearing faults. The quality of the demodulation determines the efficiency of the spectrum analysis in detecting the defect. A signal analysis technique based on minimum entropy deconvolution (MED), empirical mode decomposition (EMD), and Teager Kaiser energy operator (TKEO) is presented. The proposed method consists in enhancing the signal by using MED, decomposing the signal in intrinsic mode functions (IMFs) and selects only the IMF which presents the highest correlation coefficient with the original signal. In this study the first IMF₁ was automatically selected, since it represents the contribution of high frequencies which are first excited at the early stages of degradation. After that, TKEO is used to track the modulation energy. The spectrum is applied to the instantaneous amplitude. Therefore, the character of the bearing faults can be recognized according to the envelope spectrum. The simulation and experimental results show that an envelope spectrum analysis based on MED-EMD and TKEO provides a reliable signal analysis tool. The experimental application has been developed on acoustic emission and vibration signals recorded for bearing fault detection.

1. Introduction

The bearing may be considered as one of the most stressed parts in rotating machines. Early stage bearing defects excite first the resonance frequencies which manifest in the high frequency domain. High frequency resonance technique (HFRT) is thus mostly used in industry since it allows the extraction of components information representing defects on rotating machinery [1]. A band-pass filtering around the excited resonance frequency followed by an amplitude demodulation step exhibits the modulation frequencies representative of the fault characteristic frequency of the bearing and its associated harmonics [2, 3]. Spectral analysis of this signal (amplitude and number of harmonics) can reveal the severity of defects [4]. However, the major challenge in the application of the HFRT technique is the proper selection of the center frequency and bandwidth of the band-pass filter. Many researches have focused on the development of efficient and robust methods for estimating the proper center frequency and optimum bandwidth of the band-pass filter. Spectral Kurtosis has been proposed by Antoni and Randall [5]. However Kurtosis has its own limitation, especially when the signal is submerged by a strong and non-Gaussian noise with sudden high peaks where kurtosis shows extremely high values [6]. Other methods were developed. Barszcz and Jabłoński [7] proposed a Portrugram while Qiu et al. [8, 9] used the minimal Shannon entropy to select the proper bandwidth. Nikolaou and Antoniadis [10] and Lin and Zuo [11] selected the parameters of Morlet wavelet based on the kurtosis maximization criterion. The most commonly used method to estimate the amplitude envelope of a signal is based on the analytic signal which is derived using the Hilbert transform.

On the other hand, teager energy operator (TEO) [12], originally proposed for nonlinear signal processing, provides an effective approach to extract the instantaneous amplitudes and frequencies of a modulated signal by energy operator demodulation approach and the demodulation effect is good compared with Hilbert demodulation method; meanwhile the computation time greatly decreases [13–17]. This method was first used for the frequency and amplitude demodulation of the speech signals [12–15] and was recently adopted for vibration signals of rotating machines [16]. It incorporates both amplitude and frequency demodulation and improves the fault signal to interference ratio and thus could enhance detection performance. The energy separation algorithm is completely data driven without the need to construct any basis functions. It is therefore adaptive to the local structure of a signal. It can track the energy and identify the instantaneous frequency and instantaneous amplitude of monocomponent signals. However, it is well known that the vibration or acoustic emission signal from bearings is a multicomponent signal. For this reason, before computing TKEO, we propose to decompose the signal in multicomponents by using the empirical mode decomposition (EMD) method, since it can adaptively decompose the signal into intrinsic mode functions (IMFs) [18–22]. The TKEO can be computed for the IMF which is the most correlated with the original signal [23–25]. We thus propose to use the coefficient of correlation as an indicator to select the IMF. So, the selected IMF is the IMF which presents the higher correlation coefficient with the original signal.

However, in the early stages of bearing failure, the signal amplitude is somewhat weak and is often hidden by large noises and other signals. The selected IMF may thus be submerged by noise and cannot effectively discriminate the real bearing signal from noise. Furthermore, the TKEO is highly sensitive to the noise level. A preprocessing method is thus needed for signal decomposition using the EMD method. We propose to use the minimum entropy deconvolution (MED) which has been proven to be efficient in detecting incipient faults buried in large noise and allows for an optimal filter to extract faulty bearing signals [26, 27]. Applying the EMD method to the filtered signal allows for the signal feature of the faulty bearing to be adaptively separated from the remaining noise.

We thus proposed to combine all these three methods for the diagnosis of bearing faults. The simulation and experimental results show that this hybrid method can effectively diagnose the faults of the bearing faults. The paper is organized as follows. Section 2 introduces the principles of EMD and its algorithm. Section 3 presents the TKEO theory. Section 4 presents the basic principles of MED. Section 5 gives the results from simulation and experimental data of bearing faults. Finally, the conclusions are provided in Section 6.

2. Empirical Mode Decomposition (EMD)

The EMD method decomposes the time signal into a finite set of oscillatory functions called intrinsic mode functions (IMF). An IMF is a function that meets the following conditions.(i)The number of extrema and the number of zero crossings must either be equal or differ at most by one.(ii)The value of the moving average envelope defined by local maxima and the envelope defined by local minima is zero.

The decomposition method in IMF may be summarized as follows [19–22].(1)Initialize: , and .(2)Extract the th IMF (a)initialize: , ;(b)extract the local maxima and minima of ;(c)interpolate the local maxima and the minima by cubic spline lines to form upper and lower envelops of ;(d)calculate the mean of the upper and lower envelops of ;(e)let ;(f)if is an IMF, then set ; else go to step (b) with .(3)Define the remainder .(4)If still has least 2 extrema, then go to step (2) with ; else, the decomposition process is finished and is the residue of the signal.

3. Teager Operator Energy

The Teager-Kaiser energy tracking operator (TKEO) is a nonlinear operator considered as a high-resolution energy estimator quantifying a product of both frequency and amplitude. TKEO can track the modulation energy and identify the instantaneous amplitude and frequency. This operator was developed by Kaiser [12]. TKEO, applied on a continuous signal is defined as

The discrete function equivalent to the energy operator is given by where is a discrete-time signal.

The energy operator can extract the amplitude modulation and the frequency modulation from the signal. The TKEO has a great time resolution since the operator only needs three samples into the signal to be computed. This excellent time resolution provides the ability to capture the energy fluctuations. Furthermore, this operator is very easy to implement efficiently. The energy separation algorithm (ESA) developed by Maragos et al. [14, 15] uses the TKEO to separate into its amplitude envelope and signal to accomplish monocomponent AM-FM signal demodulation:

The ESA is a very simple demodulating technique for AM-FM demodulation. It presents a good time resolution but is very sensitive to noise. For this reason, minimum entropy deconvolution (MED) is proposed to extract the fault impulses while minimizing the noise before computing EMD and the TKEO.

4. Minimum Entropy Deconvolution (MED)

MED was originally proposed for applications on seismic recordings by Wiggins since 1978 [28]. The MED is a deconvolution aimed for extracting the fault impulses while minimizing the noise [29]. Higher entropy corresponds to a tendency to become random and the aim of MED is to enhance the structured information into the signal by searching for an optimum set of filter coefficients that recover the output signal with the maximum value of kurtosis. Kurtosis is an indicator that reflects the “peakiness” of a signal and therefore the property of impulses The detailed steps of this implementation can be recalled from [27].

5. Bearing Faults Diagnosis Based on MED-EMD and TKEO

5.1. Proposed Method for Defect Detection of Ball Bearings

The choice of the IMFs to be analyzed is usually realized by visual or experience criteria by the user. However, the process is not automatic in this way and an interaction with the user is required. We propose to use the coefficient of correlation as an indicator to select the IMF. So, the selected IMF is the IMF which presents the higher correlation coefficient with the original signal.

The procedure of the proposed method based on MED-EMD and TKEO is given as follows.(1)Enhance the peakiness of the signal by using the MED method.(2)Decompose the time domain signal into IMFs using EMD.(3)Select the IMF which has the higher correlation coefficient.(4)Compute the instantaneous amplitude using TKEO.(5)Analyze the spectrum of the envelope computed.

In order to demonstrate the effectiveness of the proposed method for fault detection of ball bearings, we proposed to compare between three methods.(i)The first method consists in applying the TKEO to the original signal .(ii)The second method consists in decomposing the signal into IMFs, selecting the IMF with higher correlation coefficient, and computing the TKEO (see Figure 1).(iii)The last one is the proposed method: step 1 consists in enhancing the peakiness of the signal using the MED technique; after that, decomposing the signal into IMFs, selecting the IMF with higher correlation coefficient, and, finally, computing the TKEO (see Figure 2).

Figure 1 

Method 2 (without using MED).

Figure 2 

Method 3 (using MED before applying EMD).

5.2. Numerically Simulated Signal

The numerically simulated signal that has been chosen is similar to the signal used in [30] with added noise. Its mathematic formulation is given as where is equal to 900,is the bearing fault frequency (BPFO equal to 100 Hz), , and . is the sampling frequency set to 48000 Hz. and are the two resonant frequencies (equal to 1800 Hz and 4000 Hz, resp.).

A normally distributed random signal with 0 mean and standard deviation of 0.3 is added into the simulated signal in (6). The signal is shown in Figure 3.

Figure 3 

Simulated noisy signal .

5.2.1. Method 1: TKEO Applied to

Computing the TKEO for the raw signal exhibits good results. Figure 4 exhibits clearly the peaks of BPFO and its harmonics which are representative of the defect.

Figure 4 

Spectrum of TKEO of .

5.2.2. Method 2: Applying EMD and TKEO

For faulty bearing, the raw signal was processed using the EMD technique. Figure 5 shows the signal and its IMFs and Table 1 list the Pearson correlation coefficients between the signal and their corresponding IMFs. Table 1 shows that the first three IMFs have much higher correlation coefficients than the others. Thus, Figure 5 only shows these first three IMFs. It may be noticed that most of the noise imbedded in the raw signal resides in IMF₁. The periodic impulses are still masked by noise and distributed in IMF₂ and IMF₃.

Figure 5 

IMF of signal .

However, the aim of the method is only to use the IMF which has the higher coefficient value with the raw signal, in order to automatically select it.

The first IMF₁ is in this case the component with the higher correlation value. The spectrum of TKEO for IMF₁ is presented in Figure 6. We note a flat spectrum, which is due to the fact that the first IMF₁ is very noisy, and the information related to the defect is not revealed.

Figure 6 

Spectrum of TKEO of IMF1 obtained by applying EMD to .

The spectrum of TKEO of IMF₂ and IMF₃ is presented in Figures 7 and 8, respectively. It can be noticed that IMF₃ exhibits the peaks of BPFO and its harmonics better than IMF₂, but not very clearly. We must conclude that the method 2 is not enough efficient.

Figure 7 

Spectrum of TKEO of IMF2 obtained by applying EMD to .

Figure 8 

Spectrum of TKEO of IMF3 obtained by applying EMD to .

5.2.3. Method 3: MED+EMD+TKEO

Before computing EMD, the MED which maximizes the kurtosis is used in order to enhance the signal. Figure 9(b) shows the result obtained after applying MED to . A decrease of noise may be noticed and the periodic shocks appear clearly. This result is obtained after 30 iterations when using MED. Figure 10 shows the evolution of the kurtosis value at each iteration. At the end of execution of MED, it can be noticed that the kurtosis of is higher than the original signal .

(a)

(b)

(a)
(b)

Figure 9 

(a) Signal , (b) signal obtained after applying MED.

Figure 10 

Values of kurtosis on each iteration of MED Algorithm.

When applying the EMD to the results obtained by MED (), the correlation is improved. Table 2 lists the Pearson correlation coefficients between the signal and their corresponding IMFs.

The first three IMFs exhibit much higher correlation coefficients than the others, and thus Figure 11 only shows the first three IMFs for the faulty bearings. Most of the noise is distributed into IMF₂, and only the periodic impulses reside into IMF₁. As indicated in Table 2, IMF₁ has a stronger correlation coefficient (0.86) than all the other signal components and contains the main component in the filtered signal. Hence, IMF₁ was selected as the final resultant signal recovered from the raw signal.

Figure 11 

MED-EMD of signal.

The spectrum of TKEO for IMF₁ (obtained by MED-EMD) is presented in Figure 12. We clearly detect the BPFO (100 Hz) due to the defect and its harmonics until 1200 Hz. The hybrid method gives thus better results than the two others presented, previously.

Figure 12 

Spectrum of TKEO of IMF1 obtained by applying MED-EMD to .

5.3. Experimental Study

The test bench used in this study is shown in Figure 13. A shaft is supported by two bearings and connected to a motor with a flanged coupling bolted rubber. Two systems were investigated, one with a healthy bearing (D0) and the other with an artificially damaged bearing (on the outer race).

Figure 13 

Test bench.

The defected bearing has a groove on the outer race as shown in Figure 14. The localized defects were created on outer race by using an electric discharge machine to keep their size and depth under control. The size of the artificial defect was about 200 μm in depth and the width () of the groove was 50 μm for the first defect (D1) and 100 μm for the second one (D2).

Figure 14 

Defect in outer race.

The measurements were conducted by using acoustic emission (AE) and vibration measurements [31]. The equipment for vibration data collection and acoustic emission is shown in Figure 15(a). They consist in an accelerometer with a sensitivity of 100 mV/g and an ultrasound detector (UE Systems UltraProb 10000). Both sensors are connected to an analogue digital converter (THOR Analyzer PRO) with a sampling frequency of 48 kHz. The latter is connected to a collector-analyzer BETAVIB. The ultrasonic sensor used in this study operates in the lower ultrasonic spectrum from 20 kHz to 100 kHz. A heterodyne circuit converts the high frequency AE signal as detected by the transducer around a central frequency into an audible signal (0–7 kHz) (Figure 15(b)). The acoustic emission signals from the two bearings (healthy and faulty) were recorded at the central frequency of = 30 kHz. The sensor filters the signal with a band [27.5 kHz–32.5 kHz]. After that, the heterodyne circuit converts the filtered signal into an audible signal. The heterodyned signal may then be recorded.

(a)

(b)

(a)
(b)

Figure 15 

(a) Data acquisition system. (b) Heterodyne principle.

The acoustic emission and vibration signals from the healthy bearing (D0) and the two bearings (D1 and D2) were recorded when rotating at two rotating speeds (300 and 600 rpm).

5.4. Experimental Application

The proposed method for signal processing was experimentally applied to the acoustic emission and vibration data.

5.4.1. Acoustic Emission

The EMD (method 2) and the MED-EMD (method 3) algorithms were applied and, to simplify the procedure, the IMF₁ was automatically selected. Tables 3 and 4 list the coefficient correlation between IMF₁ obtained by applying EMD to the original signal and between the IMF₁ after applying MED-EMD to the filtered signal with the three defect severity levels when rotating at 300 rpm and 600 rpm, respectively. It may be noticed that the correlation value when applying MED-EMD increases whatever the defect size or rotational speed.

Figures 16, 17, and 18 display the spectrum of TKEO of IMF₁ (obtained from MED-EMD: method 3) for the healthy bearing and for both defect sizes when rotating at 300 rpm.

Figure 16 

Acoustic emission spectrum of TKEO of IMF1 obtained by applying MED-EMD to D0 at speed 300 rpm.

Figure 17 

Acoustic emission spectrum of TKEO of IMF1 obtained by applying MED-EMD to D1 at speed 300 rpm.

Figure 18 

Acoustic emission spectrum of TKEO of IMF1 obtained by applying MED-EMD to D2 at speed 300 rpm.

The healthy bearing (D0) shows a flat spectrum as shown in Figure 16. When investigating a very small defect (D1), BPFO can be distinguished with its first harmonic (Figure 17). An increase of the peak amplitudes related to the BPFO frequency can be clearly noticed when the defect D2 growths (Figure 18).

It can be noticed that the defect severity not only causes an increase in the amplitude, but also generates a lot of harmonics of the bearing frequency. Consequently, the key of diagnostic relies also on the number of harmonic of the bearing frequencies [4, 32].

When rotating at 600 rpm, the healthy bearing reveals a presence of the BPFO (Figure 19) witch small amplitudes, even if the bearing is assumed healthy. In fact, even a healthy bearing presents slight defects, such as surface roughness, which are excited when increasing the rotational speed.

Figure 19 

Acoustic emission spectrum of TKEO of IMF1 obtained by applying MED-EMD to D0 case at speed 600 rpm.

For the defects D1 as shown in Figure 20, the defect frequency BPFO can be clearly distinguished with its harmonics.

Figure 20 

Acoustic emission spectrum of TKEO of IMF1 obtained by applying MED-EMD to D1 case at speed 600 rpm.

An increase of the peak amplitudes related to the BPFO frequency can be clearly noticed when the defect D2 growths (Figure 21). It also can be noticed that the number of harmonics of the defect frequency increases when increasing the rotational speed.

Figure 21 

Acoustic emission spectrum of TKEO of IMF1 obtained by applying MED-EMD to D2 case at speed 600 rpm.

5.4.2. Vibration Measurements

Tables 5 and 6 list coefficient correlation between IMF₁ obtained by applying EMD to the original signal and between the IMF₁ after applying MED-EMD to the filtered signal when rotating at 300 rpm and 600 rpm, respectively. We have the same conclusion than for acoustic emission. The correlation value when applying MED-EMD increases whatever the defect size or rotational speed.

Figures 22 and 23 display the vibration spectrum of TKEO of IMF₁ (obtained from MED-EMD: method 3) for both defect sizes when rotating at 300 rpm. When investigating a very small defect (D1), the fundamental of BPFO cannot be distinguished so clearly (Figure 22) than with acoustic emission (Figure 17).

Figure 22 

Vibration spectrum of TKEO of IMF1 obtained by applying MED-EMD to D1 at speed 300 rpm.

Figure 23 

Vibration spectrum of TKEO of IMF1 obtained by applying MED-EMD to D2 at speed 300 rpm.

An increase of the peak amplitudes related to the BPFO frequency can be clearly noticed when the defect D2 growths (Figure 23).

For the defects D1 as shown in Figure 24, the frequency BPFO can be distinguished with its harmonics when rotating at 600 rpm. An increase of the peak amplitudes related to the BPFO frequency and to its harmonics can be clearly noticed when the defect D2 growths (Figure 25).

Figure 24 

Vibration spectrum of TKEO of IMF1 obtained by applying MED-EMD to D1 at speed 600 rpm.

Figure 25 

Vibration spectrum of TKEO of IMF1 obtained by applying MED-EMD to D2 at speed 600 rpm.

Furthermore, comparing acoustic emission and vibration measurement reveals that the identification of defects is clearer and better well defined by acoustic emission than from vibration measurements.

6. Conclusions

In this paper, a new approach for fault diagnosis of bearings is presented. The algorithm involves a simple transformation and a spectral analysis step. Three methods are compared. The selected method is hybrid. First, the signal is filtered by using EMD. After that, the obtained signal is decomposed into several IMFs. The study of the correlation coefficient between each IMF and the original signal allows for automatically selecting the better IMF. In our study, the first component IMF₁, which represents the highest frequency components, was considered to accomplish the diagnosis by using the TKEO metric in order to compute the instantaneous amplitude. The method has been both applied to simulated signals and experimental signals obtained by acoustic emission and vibration measurement to validate the approach. The results have shown the effectiveness of the method. The fundamental advantage of the proposed method relies on the fact that no prior knowledge about the structural dynamics is required. The results have shown that the proposed method can effectively reveal the frequency and its associated harmonics of the faulty bearing.

Conflict of Interests

The authors declare that there is no conflict of interests regarding the publication of this paper.

Acknowledgments

The financial support of NSERC (Natural Sciences and Engineering Research Council of Canada), FQRNT (Fonds Québecois de la Recherche sur la Nature et les Technologies), MITACS Canada, and Pratt & Whitney Canada is gratefully acknowledged.