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This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

1. Introduction

Rolling-element bearing is a critical component of rotating machinery. The malfunction of a rolling-element bearing can cause a decrease in performance or even catastrophic failure with huge economic losses. To monitor the health condition and detect localized defects in a rolling-element bearing, many signal-processing techniques have been proposed and developed in recent years. As one of the most widely-used methods for vibration signal analysis, time-frequency methods, including wavelet transform [1, 2], time-frequency distribution [3, 4], time series model [5, 6], matching pursuit [7, 8], and empirical mode decomposition (EMD) [9], have been explored as powerful tools for fault detection and diagnosis of rolling-element bearings.

Local mean decomposition (LMD), originally proposed by Smith [10] in 2005, is a nonparametric, data-driven time-frequency decomposition method. It adaptively decomposes any complicated multicomponent signal into a series of product functions (PFs), each of which is a product of an envelope signal and a purely frequency-modulated (FM) signal. In addition, the instantaneous amplitude and frequency of each PF can be calculated directly according to the envelope and purely FM signals, respectively. Based on its inherent advantages, LMD is effective for analysing any complicated signal with time-varying frequency, phase, and energy. Most importantly, compared with EMD, the results of LMD are physically plausible, making the conclusions drawn from LMD relevant for various applications. Because of its simple implementation and adequate ability to reveal a signal’s nonstationary and nonlinearity information, LMD is widely used as a time-frequency analysis tool for fault diagnosis in rotating machinery [11–15]. However, the mode-mixing phenomenon has a significant influence on the results. It causes LMD to produce different scale oscillations in a single PF or similar scale oscillations in multiple PFs, resulting in some PFs with no physical meaning in the decomposition results. To overcome this drawback of LMD, Yang et al. [16] proposed a noise-assisted time-frequency analysis method called ensemble LMD (ELMD) in 2005. With ELMD, an ensemble of white noise is added to the original signal, and then the LMD method is used to decompose each of these signals into a series of separate PFs. The final PFs are calculated by averaging the corresponding PFs derived by LMD. The ELMD method can adaptively filter local oscillations into appropriate PFs through the uniform filtering characteristics of white noise, reducing the mode-mixing phenomenon and achieving better decomposition performance compared with LMD. Owing to this significant improvement, ELMD has a diverse range of applications in rotating machinery such as bearing [17, 18] and gear fault diagnoses [19]. However, after performing ELMD on a vibration signal, the added white noise in the raw signal pollutes the PFs and residual signal according to the filter bank structure of LMD. Thus, further procedure is required to precisely and effectively detect the fault characteristic information of rolling-element bearings.

The Teager-Kaiser energy operator (TKEO) was originally proposed by Kaiser in 1990 [20] to measure the energy of a mechanical process, based entirely on the local differential operation without involving any transform. It was designed to extract the amplitude-modulated (AM) and frequency-modulated (FM) signals from a monocomponent AM-FM signal. With its localization property and low computational complexity, the TKEO method has been widely used in machinery fault diagnosis. Liang and Bozchalooi [21] applied the TKEO to extract both the amplitude and frequency modulations of the vibration signals measured from mechanical systems and validated its effectiveness using both simulated and experimental data. Tran et al. [22] proposed a new approach to valve fault diagnosis of reciprocating compressor using three widely used signals involving vibration, pressure, and current of induction motor using TKEO and deep belief networks. Studies on the use of the TKEO technique for signal and image analysis are reviewed herein [23]. It should be noted that TKEO is only valid for monocomponent AM-FM signals. Thus, TKEO always fails to modulate the fault-related information when the analysed signal contains multiple signal components showing modulation phenomenon.

In this paper, a novel hybrid time-frequency analysis method based on ELMD and TKEO is proposed for fault diagnosis in rolling-element bearings. It integrates the merits of ELMD and TKEO to detect localized defects in rolling-element bearings. First, the ELMD method is applied to decompose a multicomponent raw signal measured from faulty rolling-element bearings into a series of PFs, where each PF was a monocomponent AM-FM signal, namely, a product of an envelope signal and a purely FM signal. Second, a sensitive parameter (SP) based on correlated kurtosis (SK) and Pearson’s correlation coefficient (PCC) is employed to select the PF component that contains the most characteristic of the fault information. Finally, the TKEO is applied to extract both the amplitude and frequency modulations from the selected PF. Furthermore, the spectrum analysis is used to explore the fault information according to the appearance of the fault characteristic frequencies. To highlight the superiority of the proposed method, some comparisons with two popular signal processing methods including variational mode decomposition [24] and minimum entropy deconvolution (MED) [25, 26] were conducted in the analysis of experimental fault signals.

The rest of this paper is organized as follows. Section 2 briefly introduces the ELMD and TKEO techniques. Section 3 details the proposed hybrid time-frequency analysis method. Section 4 describes the application of the proposed technique to fault diagnosis in rolling elements. Furthermore, comparisons with VMD and MED are conducted in this section. Concluding remarks are presented in Section 5. The introduction should be succinct, with no subheadings. Limited figures may be included only if they are truly introductory and contain no new results.

2. Background Theories

2.1. The Theory of ELMD

2.1.1. LMD

LMD is an adaptive, nonparametric time-frequency analysis method pioneered by Smith [10] in 2005. This method decomposes a raw signal into a series of PFs using the local oscillations of the signal itself. Meanwhile, the instantaneous amplitude and frequency of each PF can be estimated from the corresponding amplitude envelope and FM signals, respectively. The LMD procedure is summarized briefly as follows [10].

Step 1.

Find the local extreme points $n_{i} (i = 1, 2, \dots, M)$ of the targeted signal $x (t)$ , where $M$ is the number of extreme points. Then, calculate the local mean value and local envelope magnitude of two successive extreme points as $\begin{matrix} (1) & m_{i} = \frac{n_{i} + n_{i + 1}}{2}, \\ a_{i} = \frac{|n_{i} - n_{i + 1}|}{2} . \end{matrix}$

Step 2.

Use the moving average algorithm to smooth the local mean values and local amplitudes, and obtain a varying continuous local mean function $m_{1, 1} (t)$ and a varying continuous local amplitude function $a_{1, 1} (t)$ , respectively.

Step 3.

Subtract the local mean function from the original signal $x (t)$ and obtain $\begin{matrix} (2) & h_{1, 1} (t) = x (t) - m_{1, 1} (t), \end{matrix}$ where $h_{1, 1} (t)$ is the residual signal. Then, $h_{1, 1} (t)$ is divided by the amplitude function $a_{1, 1} (t)$ , resulting in $\begin{matrix} (3) & s_{1, 1} (t) = \frac{h_{1, 1} (t)}{a_{1, 1} (t)} . \end{matrix}$

Step 4.

Set $s_{1, 1} (t)$ as the target signal and repeat steps (1–3) until a purely FM signal $h_{1, n} (t)$ is obtained. This is expressed as $\begin{matrix} (4) & \{\begin{cases} h_{1, 1} (t) = x (t) - m_{1, 1} (t), \\ h_{1, 2} (t) = s_{1, 1} (t) - m_{1, 2} (t), \\ ⋱ \\ h_{1, n} (t) = s_{1, (n - 1)} (t) - m_{1, n} (t), \end{cases} \end{matrix}$ where $\begin{matrix} (5) & \{\begin{cases} s_{1, 1} (t) = \frac{h_{1, 1} (t)}{a_{1, 1} (t)}, \\ s_{1, 2} (t) = \frac{h_{1, 2} (t)}{a_{1, 2} (t)}, \\ ⋱ \\ s_{1, n} (t) = \frac{h_{1, n} (t)}{a_{1, n} (t)} . \end{cases} \end{matrix}$

Step 5.

The envelope signal is calculated as $\begin{matrix} (6) & a_{1} (t) = \prod_{i = 1}^{n} a_{1, i} (t), \end{matrix}$ and the first PF is given as $\begin{matrix} (7) & {P F}_{1} (t) = a_{1} (t) s_{1, n} (t) . \end{matrix}$

The corresponding instantaneous phase $ϕ_{1} (t)$ and instantaneous frequency $f_{1} (t)$ are calculated as $\begin{matrix} (8) & ϕ_{1} (t) = \arccos (s_{1, n} (t)), \\ f_{1} (t) = \frac{f_{s} d ϕ_{1} (t)}{2 π d t} . \end{matrix}$

Step 6.

Subtract the derived ${P F}_{1} (t)$ from the original signal $x (t)$ , obtaining the signal $u_{1} (t)$ . Then, regard set $u_{1} (t)$ as the new target signal and repeat the steps (1–5) until $u_{J} (t)$ is a constant or contains no oscillations: $\begin{matrix} (9) & \{\begin{cases} u_{1} (t) = x (t) - {P F}_{1} (t), \\ u_{2} (t) = u_{1} (t) - {P F}_{2} (t), \\ ⋱ \\ u_{J} (t) = u_{J - 1} (t) - {P F}_{J - 1} (t) . \end{cases} \end{matrix}$

Finally, the original signal can be reconstructed as $\begin{matrix} (10) & x (t) = \sum_{j = 1}^{J} {P F}_{j} (t) + u_{J} (t) . \end{matrix}$

2.1.2. ELMD

LMD is essentially a filter bank with a self-adaptive bandwidth and centre frequency; however, it is susceptible to mode mixing. The results of LMD often contain pseudo-PFs with no physical meaning, which confuse researchers and engineers in a wide variety of fields. To improve LMD, ELMD was proposed by Yang et al. [16] to mitigate the mode-mixing problem by adding white noise to the original signal. The final ELMD PFs are calculated by taking the ensemble means of the corresponding PFs decomposed from the original signal plus the Gaussian white noise in each trial. A flowchart of the ELMD algorithm is illustrated in Figure 1:

Step 1.

For any trial index $i (i = 1, 2, \dots, I)$ , add the white noise $β n_{i} (t)$ to the original signal $x (t)$ to generate the polluted signal $x_{i} (t)$ : $\begin{matrix} (11) & x_{i} (t) = x (t) + β n_{i} (t), \end{matrix}$ where $n_{i} (t)$ denotes the white noise with zero mean and unit variance, $β$ is the amplitude of the added white noise, and $I$ is the trial number.

Step 2.

Decompose the polluted signal $x_{i} (t)$ using the LMD algorithm: $\begin{matrix} (12) & x_{i} (t) = \sum_{j = 1}^{J} {P F}_{i, j} (t) + u_{i} (t), \end{matrix}$ where ${P F}_{i, j} (t)$ is the $j$ th PF of the $i$ th trial, $u_{i} (t)$ denotes the residual of the $i$ th trial, and $J$ is the number of PFs.

Step 3.

Calculate the ensemble means of the corresponding decomposed PFs: $\begin{matrix} (13) & {P F}_{j} (t) = \frac{1}{I} \sum_{j = 1}^{I} {P F}_{i, j} (t), \end{matrix}$ where ${P F}_{j} (t)$ is the $j$ th PF for $j = 1, 2, \dots, J$ .

[figure omitted; refer to PDF]

2.2. The Theory of TKEO

The Teager-Kaiser energy operator (TKEO) is an attractive demodulation method proposed by Kaiser [20]. It is an alternative for obtaining the amplitude-modulated (AM) signal and frequency-modulated (FM) signal from the vibration signal. For a continuous time signal $x (t)$ , the TKEO is defined as $\begin{matrix} (14) & ψ [x (t)] = {(\frac{d x (t)}{d t})}^{2} - x (t) \frac{d^{2} x (t)}{d t^{2}} . \end{matrix}$

Thus, the TKEO is defined in discrete format by [21] $\begin{matrix} (15) & ψ [x (n)] = {[x (n)]}^{2} - x (n + 1) x (n - 1) . \end{matrix}$

As a signal demodulation method, TKEO offers superior performance in recovering the time-frequency information of a vibration signal and provides a vital approach for fault diagnosis of rolling-element bearings. Note that the TKEO method is only applicable to monocomponent AM-FM signals. This shortcoming greatly limits the wide application of TKEO. For a multicomponent signal, a decomposition or modulated procedure is always necessary before the implementation of TKEO.

3. Time-Frequency Analysis Method Based on ELMD and TKEO

3.1. Selection of Sensitive PF

The ELMD method can yield better decomposition performance than the classical LMD method in terms of overcoming the mode-mixing problem and reducing the pseudo modes. However, the existing noise still remains in the PFs according to the filter bank structure of LMD. Thus, to achieve a precise fault detection result, it is necessary to carefully select the PF component. Most of the studies conducted so far ignored systematic selection of most effective PFs for bearing diagnosis. Kurtosis is sensitive to the impacts induced by localized defects and thus is widely chosen to select the sensitive PF containing the most fault-related information. But it is also sensitive to random impulses caused by external interferences on the bearing housing. Correlated kurtosis [24] is another index for measuring the intensity of periodic impulses. The first-shift correlated kurtosis of the $j$ th PF is defined as follows: $\begin{matrix} (16) & {C K}_{j} = \frac{\sum_{n = 1}^{N} {({P F}_{j} (n) {P F}_{j} (n - m T))}^{2}}{{(\sum_{n = 1}^{N} {P F}_{j}^{2} (n))}^{2}}, \end{matrix}$ where $T$ is the fault period of interest and is calculated as follows: $\begin{matrix} (17) & T = \frac{F s}{f_{m}}, \end{matrix}$ where $f_{m}$ and $F s$ are the fault frequency and the sampling frequency, respectively. When the fault period $T$ , calculated according to Equation (17), is a fractional number, the resampling technique is necessary before the iterative procedure can be implemented [26]. Compared to kurtosis, correlated kurtosis remains unaffected by the random impulses and is more robust and more suitable for detecting the fault-related information contained in PFs.

Besides, Pearson’s correlation coefficient (PCC) is widely used to select the sensitive PF. It measures the consistence between the recovered signal and the reference signal. The ${P C C}_{j} (j = 1, 2, \dots, J)$ between the $j$ th PF of the raw signal $x (n)$ and the raw signal $x (n)$ is defined as $\begin{matrix} (18) & {P C C}_{j} = \frac{{(x - \bar{x})}^{T} ({P F}_{j} - \bar{{P F}_{j}})}{‖x - \bar{x}‖ \cdot ‖{P F}_{j} - \bar{{P F}_{j}}‖}, \end{matrix}$ where $‖\cdot‖$ represents the root-mean-square operator and $\bar{x}$ and $\bar{{P F}_{j}}$ represent the mean values of $x$ and ${P F}_{j}$ , respectively. Note that the value of ${P C C}_{j}$ is limited in [0, 1]. The sensitive parameter (SP) of the $j$ th PF is defined as $\begin{matrix} (19) & {S P}_{j} = {P C C}_{j} \cdot f_{j}, \end{matrix}$ where $\begin{matrix} (20) & f_{j} = \frac{{C K}_{j} - \min (C K)}{\max (C K) - \min (C K)} . \end{matrix}$

To avoid extreme value of CK, the min–max normalization technique is utilized to normalizing the function $f_{j}$ ranging from 0 to 1. Hence, after calculating using Equation (20), the PF with maximum correlation value will be normalized to a value of 1 and the PF with the least correlation is normalized to a value of 0. Only the first 6 PFs from the decomposition are considered in this study as the remaining PFs are typically residual or trends and do not contain bearing-related fault information.

3.2. Time-Frequency Analysis Method for Fault Detection of Rolling-Element Bearings

A novel time-frequency method combing the capabilities of ELMD and TKEO, automatically decomposing a nonstationary signal into PFs and extracting the AM signal, respectively, is proposed for fault detection and diagnosis of rolling-element bearings. In the proposed method, a series of PFs is obtained using ELMD and the PF that contains the most fault-related information is selected according to the SP value. Then, the TKEO method is adopted to obtain the amplitude and frequency modulations from the selected PF. The scheme of the proposed method for fault diagnosis of rolling-element bearings is illustrated in Figure 2.

Step 1.

Decompose original vibration signal into a series of PFs using ELMD.

Step 2.

Calculate the SP value of each PF, and select a sensitive PF based on the SP value.

Step 3.

Extract the amplitude and frequency modulations from the selected PF using TKEO.

Step 4.

Detect faults using spectrum analysis.

[figure omitted; refer to PDF]

4. Experiment Results

To demonstrate the effectiveness of the proposed time-frequency analysis method, high-speed train bearing fault signals measured in a bearing test rig are analysed in this section. The experimental test rig and the investigated faulty bearing are presented in Figure 3. Two accelerometer sensors mounted on the shaft box were used to collect vibration signals from the faulty bearings. The defects on the rolling element and outer race were implanted artificially with a width of 0.2 mm and a depth of 0.3 mm. The rolling element number (n), rolling element diameter (d), rolling element pitch diameter (D), and load angle ( $ϕ$ ) were 17, 26.691 mm, 187.205 mm, and 12.083 degree, respectively. The four types of bearing characteristic frequency, namely, bearing pass frequency of outer race (BPFO), bearing pass frequency of inner race (BPFI), ball spin frequency (BSF), and fundamental train frequency (FTF), can be calculated as follows [27]: $\begin{matrix} (21) & B P F O = \frac{n f_{r}}{2} (1 - \frac{d}{D} \cos ϕ), \\ B P F I = \frac{n f_{r}}{2} (1 + \frac{d}{D} \cos ϕ), \\ B S F = \frac{D}{2 d} [1 - {(\frac{d}{D} \cos ϕ)}^{2}], \\ F T F = \frac{f_{r}}{2} (1 - \frac{d}{D} \cos ϕ), \end{matrix}$ where $f_{r}$ is the shaft speed. The sampling frequency and signal length were 5120 Hz and 8192, respectively. In addition, in the experimental analysis, the amplitude of the added white noise $β$ and the trial number $I$ of the ELMD were set as 0.1 and 100, respectively.