Marine propulsion shaft system fault diagnosis method based on partly ensemble empirical mode decomposition and SVM
Taotao Zhou^{1} , Xianming Zhu^{2} , Chongjian Wu^{3} , Weicai Peng^{4}
^{1, 2, 3, 4}National Key Laboratory on Ship Vibration and Noise, China Ship Development and Design Center, Wuhan 430064, China
^{1}Corresponding author
Journal of Vibroengineering, Vol. 17, Issue 4, 2015, p. 17831795.
Received 4 March 2015; received in revised form 15 May 2015; accepted 8 June 2015; published 30 June 2015
This paper investigates the application of the Partly Ensemble Empirical Mode Decomposition (PEEMD), Principal Component Analysis (PCA) and Support Vector Machine (SVM) on signal processing, attribute reduction and pattern recognition. On this basis, a novel method for mechanical faulty diagnosis based on PEEMD, PCA and SVM is presented, which utilizes the PEEMD to extract faulty feature parameters from the statistical characteristics of intrinsic mode functions to constitute feature vectors, and then makes the attribute reduction by PCA method to obtain the key features, lastly these key features are input into GAoptimized SVM to accomplish faulty pattern recognition. The experimental results of the proposed method to fault diagnosis of the rolling bearing and stern bearing on marine propulsion shaft system show that this method can extract the faulty features, which have better classiﬁcation ability and at the same time reduce the computation complexity significantly, accordingly improve the classiﬁer efﬁciency and achieve a better classiﬁcation performance.
Keywords: propulsion shaft system, fault diagnosis, partly ensemble EMD, support vector machine.
1. Introduction
By reducing costs and decreasing the repair time, condition based maintenance becomes an efficient strategy for ship industry [1]. Marine propulsion shaft system is the key components of the ship power system. It influences directly the operation of the whole ship. Therefore, it is signiﬁcant to be able to accurately and automatically detect and diagnose the existence and severity of the faults occurring in the marine propulsion shaft system. Since vibration signals carry a great deal of information representing mechanical equipment health conditions, the vibration based signal processing technique is one of the principal tools for diagnosing bearing faults [2, 3].
Typically, a fault diagnosis system contains two steps. The first step is to extract fault features by signal processing; the second step is to diagnose the faults by the characteristic information obtained in the first step. With the signal processing techniques, faulty characteristic information can be extracted from the vibration signals [4]. Considering the nonstationary of the Marine propulsion shaft system, the time frequency analysis methods such as Wavelet Transform (WT) [5, 6] and Empirical Mode Decomposition (EMD) [7] were used for processing the complex signal. EMD method [8] introduced by Huang et al. is an innovative timeseries analysis tool in comparison with traditional methods such as Fourier methods, wavelet methods, and empirical orthogonal functions. A nonstationary and nonlinear signal will be decomposed into several Intrinsic Mode Function (IMF) components by sifting process of EMD. The result is a set of nearly orthogonal functions and the number of functions in the set depends on the original signal [9]. One of the primary weaknesses of EMD method is the phenomenon of mode mixing, which is defined as either a single IMF containing different scales signal, or a signal of a similar scale existing in different IMF components. In order to overcome shortcomings of EMD, a noiseassisted data analysis method called Ensemble EMD (EEMD) was proposed in [10] by adding white noise to initial data. The IMFs derived from EEMD, however, would inevitably be polluted by the added noise especially when the number of trials was in appropriate and this can be really true when reconstructing the original signal from the obtained IMFs. Recently, an enhanced EEMD algorithm called Complementary EEMD (CEEMD) was proposed to improve the efficiency of the original noise assisted method by adding noise in pairs with plus and minus signs [11]. However, in EEMD and CEEMD methods, the ensemble process is timeconsuming especially when the number of trials is large. Moreover, the IMFs derived from EEMD and CEEMD often include some false and meaningless IMF components and some of them even do not meet the IMF definition conditions. In older to overcome these disadvantages of EEMD and CEEMD, another noiseassisted method Partly Ensemble EMD (PEEMD) is proposed in [12]. PEEMD decomposes a signal in a CEEMD way in the first ith IMFs and then using EMD in the remaining ranks, instead of implementing ensemble and averaging to all IMFs. Hence, PEEMD can reduce the amounts of calculation of CEEMD and improve the accuracy of obtained IMFs greatly.
Generally the vibration signals are obtained from the monitoring mechanical equipment. After the signal decomposed into several IMFs through PEEMD method, the statistical features like energy and kurtosis can be calculated to describe the characteristics of the signal at each frequency band. These statistical features can be utilized in the fault diagnosis directly, but in practice some of the features extracted from experimental data are usually imperfect and redundancy, even incompatible for each other, accordingly bring forth a lot of problems to mechanical fault diagnosis such as high computational complexity, low recognition speed and weak recognition effect. So it is meaningful to investigate the fault diagnosis method using the less attribute values without missing any fault information.
Fig. 1. Flow diagram of the proposed fault diagnostic procedure
Principal Component Analysis (PCA) is a wellestablished method for feature extraction and dimensionality reduction [13]. PCA can be used to represent the ddimensional data in a lowerdimensional space which will reduce the freedom degrees, the space and time complexities. The objective is to represent data in a space that best expresses the variation in a sumsquared error sense. This technique is mostly useful for segmenting signals from multiple sources. Recently, the principal component analysis has been widely applied in machine fault diagnosis domain [14, 15].
In recent years, SVM has been widely used in many research areas, such as face recognition, signal and image processing and fault diagnosis. SVM based classiﬁers have better generalization properties than ANN based classiﬁers [16, 17]. The efﬁciency of SVM based classiﬁer does not depend on the number of features. This property is very useful in fault diagnostics because the number of features to be chosen is not limited, which make it possible to compute directly using original data without preprocessing them to extract their features. These advantages make SVM an excellent choice for the fault detection and localization applications [18]. Meanwhile, SVM kernel function parameters selection problem is an important factor affecting the performance of classification ability, Genetic Algorithm (GA) was used for optimizing the kernel function parameters.
According to the above principles, a new fault diagnosis method for marine propulsion shaft system is proposed in this paper, which utilizes the PEEMD to extract faulty feature parameters and then makes the attribute reduction in the faulty feature vectors by PCA method to obtain the key features, lastly these key features are input into SVM to accomplish faulty diagnosis. The flow diagram of the presented fault diagnosis method is shown in Fig. 1.
The following of this paper is organized as follows: in Section 2, the statistics parameters of the IMF components are extracted as faulty features by PEEMD. In Section 3, GAoptimized SVM is used to accomplish the fault pattern classiﬁcation based on the selected features. In Sections 4 and 5, the proposed method is applied to diagnose different conditions of a rolling bearing and stern bearing on marine propulsion shaft system, and the results have veriﬁed the validity of the proposed diagnosis method. At last the conclusions have been briefly drawn in Section 6.
2. PEEMD method
By using EMD a complex signal can be decomposed into finite IMFs and a residual item. However, the main problem of EMD is the phenomenon of mode mixing. Aim to this, EEMD is proposed by adding different white noises to the targeted signal. The IMFs derived from EEMD would inevitably be polluted by the added noise. And CEEMD is presented mainly with the aim to decrease the reconstruction error caused by the added white noises. Unlike EEMD, in CEEMD white noises are added in pairs to the original data (i.e. one positive and one negative) to generate two sets of ensemble IMFs. Yet CEEMD and EEMD mainly have the following problems. First, the ensemble process is timeconsuming especially when the number of trials is large. Second, the IMFs derived from EEMD and CEEMD often include some false and meaningless IMF components and some of them even do not meet the IMF definition conditions. This is mainly caused by the fact that different noiseadded data may generate different number of IMFs, though adding white noise with the same size.
In order to avoid the defects of EEMD and CEEMD, another noiseassisted method partly ensemble EMD is proposed, which decomposes a given signal in a CEEMD way in the first ($j$1)th IMFs and then using EMD in the remaining ranks, instead of implementing ensemble and averaging to all IMFs. Hence, PEEMD can reduce the amounts of calculation of CEEMD and improve the accuracy of obtained IMFs greatly. PEEMD is described as follows [12, 19].
(1) Suppose $j=$ 1, add white noise series $\left\{{n}_{i}\right(t\left)\right\}$ and $\{{n}_{i}(t\left)\right\}$ to the targeted signal $S\left(t\right)$ as:
where $a$ is the amplitude of added white noise, $i=$ 1, 2,…, ${N}_{e}$; ${N}_{e}$ is the pair number of added white noise. In EEMD Wu and Huang suggested [10] to use small amplitude values for data dominated by highfrequency signals, and vice versa. Hence, they recommended that ${N}_{e}$ could be chosen about a few hundred, and the amplitude of added white noise was set about 0.2$SD$, where $SD$ was the standard deviation of the targeted data. The ${N}_{e}$ was set 100 and parameter $a$ was set 0.2$SD$ in this paper.
(2) Decompose the two signal series $\left\{{r}_{ij}^{+}\right(t\left)\right\}$ and $\left\{{r}_{ij}^{}\right(t\left)\right\}$ using EMD in the $j$th IMF mode, and two IMF sets $\left\{{I}_{ij}^{+}\right(t\left)\right\}$ and $\left\{{I}_{ij}^{}\right(t\left)\right\}$ can be obtained, as well as two residue sets $\left\{{r}_{i,j+1}^{+}\right(t\left)\right\}$ and $\left\{{r}_{i,j+1}^{}\right(t\left)\right\}$, respectively.
Namely:
(3) Through ensemble the final IMF in the $j$th rank can be derived by:
(4) Calculate the Permutation Entropy (PE) ${P}_{j}^{}$ of ${I}_{j}^{}\left(t\right)$, if ${P}_{j}^{}$ is larger than ${\theta}_{0}^{}$, then $j=j+$1, and go to steps (2)(3); if ${P}_{j}^{}$ is smaller than ${\theta}_{0}^{}$, then go to step (5).
As PE is defined to measure the randomicity and dynamic change of time series, according to the experiments in [12], a recommended value of ${\theta}_{0}^{}$ ranges from 0.5 to 0.6 and in this paper we set ${\theta}_{0}^{}=$ 0.6.
(5) Separate the first $j$1 IMFs from the original signal and the residue $r\left(t\right)$ is obtained by:
(6) Decompose $r\left(t\right)$ completely by using EMD:
(7) $\left\{{c}_{k}\right(t\left)\right\}$ are regarded as the IMFs following to the first $j$1 IMFs. The initial signal is informed as:
PEEMD decomposes a given signal in a CEEMD way in the first ($j$1)th IMFs and then using EMD in the remaining ranks, instead of implementing ensemble and averaging to all IMFs. In order to clarify the decomposition processes, consider the case of the signal as:
${x}_{1}\left(t\right)=2\mathrm{s}\mathrm{i}\mathrm{n}\left(2\pi \times 30\times t+\frac{\pi}{2}\right),t\in \left[\mathrm{0,2}\right],$
${x}_{2}\left(t\right)=\left(t+1\right)\times \mathrm{s}\mathrm{i}\mathrm{n}\left(2\pi \times 8\times t+\frac{\pi}{3}\right),t\in \left[\mathrm{0,2}\right],$
$x\left(t\right)={x}_{1}\left(t\right)+{x}_{2}\left(t\right)+n\left(t\right),t\in \left[\mathrm{0,2}\right].$
The time domain waveforms of ${x}_{1}\left(t\right)$, ${x}_{2}\left(t\right)$, $n\left(t\right)$ and their mixed signal $x\left(t\right)$ are showed in Fig. 2. The decomposing results of the mixed signal $x\left(t\right)$ are given in Figs. 36, respectively.
Fig. 2. The time domain waveforms of ${x}_{1}\left(t\right)$, ${x}_{2}\left(t\right)$, $n\left(t\right)$ and their mixed signal $x\left(t\right)$
Fig. 3. EMD decompose results of the mixed signal $x\left(t\right)$
Fig. 4. EEMD decompose results of the mixed signal $x\left(t\right)$
Fig. 5. CEEMD decompose results of the mixed signal $x\left(t\right)$
Fig. 6. PEEMD decompose results of the mixed signal $x\left(t\right)$
Where IMF $i$ represents the $i$th IMF, and RES stands for the residual, correspondingly. From Figs. 36, it can be found that, due to the noise interference, EMD has emerged severe mode mixing and yielded false components without physical meanings. EEMD and CEEMD have similar decomposing results and both of them restrain the phenomenon of mode mixing effectively. The sum component IMF 1 and IMF 2 corresponds to the real component $n\left(t\right)$. However, ${x}_{1}\left(t\right)$ and ${x}_{2}\left(t\right)$ are divided into seven and five components by EEMD and CEEMD respectively. PEEMD performed well with a zero residue and the components IMF 3 and IMF 4 (RES) are in excellent agreement with the real component ${x}_{1}\left(t\right)$ and ${x}_{2}\left(t\right)$.
3. SVM method
SVM is a statistic machine learning technique proposed by Vapnik [20] and widely used in pattern recognition. Let $\left\{\right({x}_{i},{y}_{i}),i=1,\dots ,N\}$ be a training sample set $Q$ and each sample ${x}_{i}$ belongs to a class defined by ${y}_{i}\in \left\{1,\mathrm{}1\right\}$. The goal of SVM is to ﬁnd a hyperplane which divides $Q$, such that all the points with the same label are on the same side of the hyperplane while maximizing the distance between the two classes I, II and the hyperplane. An example of the optimal hyperplane of two data sets is presented in Fig. 6.
Fig. 7. a) A separating plane with small margin and b) a separating plane with larger margin
a)
b)
As shown in Fig. 7, rings and diamonds stand for these two classes of sample points respectively; $H$ is a separating plane. ${H}_{1}$ and ${H}_{2}$ are planes that are parallel to $H$ and, respectively, pass through the sample points closest to $H$ in these two classes. The distance between ${H}_{1}$ and ${H}_{2}$ is deﬁned as margin.
For linearly separable data, it is possible to determine a hyperplane that separates the data leaving one class on each side of the hyperplane. This plane can be described by the Eq. (7):
where $w$ is $W\in {R}^{n}$ weight vector and $b$ is a scalar. The vector $w$ and the scalar $b$ determine the position of the separating hyperplane. The separating hyper plane should satisfy the constraints:
Positive slack variables ${\xi}_{i}$ are introduced to measure the distance between the margin and the vectors ${x}_{i}$ that lie on the wrong side of the margin. Then, the optimal hyper plane separating the data can be obtained by the following optimization problem:
$\text{subjectto}{y}_{i}f\left({x}_{i}\right)={y}_{i}\left({w}^{T}x+b\right)\ge 1{\xi}_{i},{\xi}_{i}\ge 0,\mathrm{}\mathrm{}\mathrm{}i=1,2,\dots ,N,$
where $C$ is the error penalty parameter. By introducing the Lagrangian multipliers ${\alpha}_{i}$, the abovementioned optimization problem is transformed into the dual quadratic optimization problem, that is:
$\text{subjectto}\text{}{\alpha}_{i}\ge 0,\mathrm{}\mathrm{}\mathrm{}i=1,2,\dots ,N,\sum _{i=1}^{N}{\alpha}_{i}{y}_{i}=0.$
Thus, the linear decision function is created by solving the dual optimization problem, which is defined as:
SVM can also be used in nonlinear classification by using kernel function. By using the nonlinear mapping function $\mathrm{\Phi}\left({x}_{i}\right)$, the original data $x$ are mapped into a highdimensional feature space, where the linear classification is possible. Then, the nonlinear decision function is:
where $K({x}_{i},{x}_{j})$ is called the kernel function, $K({x}_{i},{x}_{j})=\mathrm{\Phi}\left({x}_{i}\right)\mathrm{\Phi}\left({x}_{j}\right)$.
Any function that satisfies Mercer’s theorem can be used as a kernel function to compute a dot product in feature space. There are different kernel functions used in SVMs, such as linear, polynomial and Gaussian RBF. The selection of the appropriate kernel function is very important, since the kernel defines the feature space in which the training set examples will be classified.
In order to apply SVM in mechanical fault diagnosis, there are two aspects of problems to study. Firstly, we can construct a multiclassiﬁer by combining several binary classiﬁers for SVM is a binary classification method. Several methods have been proposed, such as ‘oneagainstone’ (OAO), ‘oneagainstall’ (OAA), and directed acyclic graph SVMs (DAGSVM) [21], where Hsu make a comparison of these methods and point out that the ‘oneagainstone’ method is more suitable for practical use than other methods. In this study, we employ ‘oneagainstone’ method to diagnose the different faulty condition. Secondly, the radial basis function kernel $K({x}_{i},x)=\mathrm{e}\mathrm{x}\mathrm{p}({\Vert {x}_{i}x\Vert}^{2}/2{\sigma}^{2})$ is selected and the Genetic Algorithm (GA) algorithm [22] is adopted for SVM model generalization parameter $\gamma $ selection and searching proper RBF kernel parameter width $\sigma $.
4. Experimental setup and data acquisition
To demonstrate the performance of the proposed fault diagnosis method, two kinds of experimental setups are presented in this section for offering the vibration signals from various faulty conditions of rolling bearings and stern bearing on a marine propulsion shaft system.
4.1. The rolling bearing experiment
The experimental setup consists of a 2 hp motor, a torque transducer, a dynamometer and control electronics. The test bearings support the motor shaft [23]. Motor bearings are seeded with faults using ElectroDischarge Machining (EDM). Faults ranging from 0.007 inches in diameter to 0.040 inches in diameter are introduced separately at the inner raceway, rolling element and outer raceway. Faulted bearings are reinstalled into the test motor and vibration data is recorded for motor loads of 0 to 3 horsepower (motor speeds of 1797 to 1730 RPM). Vibration data is collected using accelerometers, which are attached to the housing with magnetic bases.
Fig. 8. Schematic diagram of the propulsion shaft system experiment setup
4.2. The propulsion shaft system experiment
The second experiment is to identify different conditions of stern bearing on a propulsion shaft system. As shown in Fig. 8, the test stand consists of a motor, a gear box, a center bearing, a stern bearing and a propeller. The test stern bearing support the propulsion shaft. Several typical faulty conditions of the stern bearing are simulated, such as parallel misalignment being too large and the angular misalignment being too large. Five states including four faulty states and one normal state of stern bearing are tested. The description of the five states of stern bearing is shown in Table 1.
Table 1. Five states of stern bearing on propulsion shaft system
Condition code

Faulty description


C1

Normal condition


C2

Parallel horizontal misalignment being too large

Horizontal offset 2.5 mm

C3

Parallel vertical misalignment being too large

Vertical offset 2.5 mm

C4

Angular horizontal misalignment being too large

The aft of bearing horizontal offset 3 mm

C5

Angular vertical misalignment being too large

The aft of bearing vertical offset 3 mm

The diameter of the stern bearing is 250 mm. In order to avoid the misalignment is too large which will destroy the propulsion shaft system or too small which will affect the test of faulty conditions, the parallel horizontal misalignment and parallel vertical misalignment are both set 2.5 mm. At the same time, the angular horizontal misalignment and angular vertical misalignment are set 3 mm. The parallel misalignment and angular misalignment are showed in the Fig. 9.
Fig. 9. Schematic diagram of the parallel misalignment and angular misalignment
a) Parallel misalignment
b) Angular misalignment
Vibration data was collected using accelerometers, which were attached with rubber bases to the ends of stern bearing as showed in the Fig. 9. Accelerometers were placed at the 9 o’clock position and 3 o’clock position at the front end and rear end of the stern bearing. One group (20480 points) was collected per minute with a sampling rate of 25.6 kHz. 160 groups of each condition were collected, and 80 groups are used for training the SVM model and another 80 groups were adopted for testing.
5. Results and discussion
In order to identify different working conditions of the monitoring bearing and stern bearing on propulsion shaft system, the proposed fault diagnosis method mentioned above is performed.
Fig. 10. The CEEMD decomposition results of rolling bearing vibration signal with rolling element defects in 1750RPM
5.1. Case 1: fault diagnosis of bearing
Firstly, the rolling bearing faulty signals are decomposed into several IMFs using PEEMD and CEEMD and the cost time are studied. The decomposition results of rolling element defects signal in 1750RPM through CEEMD and PEEMD are showed in Fig. 10 and Fig. 11, respectively. Since the IMFs of each signal are different and only the first IMFs contain the main faulty characteristic, the first five IMFs of each signal are selected. The statistical features, energy and kurtosis, of the five IMFs are calculated to construct a 10dimensional feature vector. According to the faulty features classiﬁcation method described in Section 3, the classiﬁcation accuracies using all the PEEMD faulty features and using all the CEEMD faulty features are investigated. The results are listed in Table 2.
Table 2. The feature extraction cost time (s) and fault diagnosis accuracies (%) of rolling bearing
Work load condition

Signal processing method

Cost time (s)

Classification accuracy

Condition 1 (1750RPM)

CEEMD

109.5

98.25 %

PEEMD

27.0

99.25 %


Condition 2 (1797RPM)

CEEMD

105.9

98.50 %

PEEMD

29.2

99.75 %

Fig. 11. The PEEMD decomposition results of rolling bearing vibration signal with rolling element defects in 1750RPM
The results show that the calculating time of PEEMD save a great deal than CEEMD method. At the same time, the GAoptimized SVM recognition accuracies of using PEEMD faulty features are higher than using CEEMD faulty features. It indicates that the PEEMD method is more effective and need less calculating time than CEEMD method.
Meanwhile, considering the PEEMD faulty features, the recognition accuracies using all faulty features and using the extracted faulty features through PCA are researched. The results are listed in Table 3.
From Table 3, we can find that the recognition accuracies obtained using the selected faulty features through PCA are little more than those obtained using all faulty features.
Table 3. The recognition accuracies (%) of rolling bearing obtained using all faulty features and using the selected faulty features through PCA
Work load condition

Classiﬁcation accuracies using all features

Classiﬁcation accuracies using selected features

Condition 1 (1750RPM)

99.25 %

99.50 %

Condition 2 (1797RPM)

99.75 %

100.00 %

5.2. Case 2: fault diagnosis of stern bearing on propulsion shaft system
As showed in Fig. 7, there are two acceleration sensors attached in stern bearing for collecting the vibration signals. As the same in Section 5.1, the vibration signals are decomposed into several IMFs using PEEMD and CEEMD, and the calculating time are investigated. The statistical features, energy and kurtosis, of the first five IMFs are used to construct a 20dimonsional diagnosis feature vector, respectively. According to the GAoptimized SVM classiﬁcation method, the classiﬁcation accuracies using all the PEEMD faulty features and PCA selected PEEMD faulty features; using all the CEEMD faulty features and PCA selected CEEMD faulty features are investigated. The results are listed in Table 4.
Table 4. The recognition accuracies (%) of stern bearing on marine propulsion shaft system obtained using all faulty features and using the selected faulty features through PCA
Signal processing method

Cost time (s)

Features extracted

Features selected

Classiﬁcation accuracies using all features

Classiﬁcation accuracies using selected features

CEEMD

104.6

20

5

91.25 %

92.25 %

PEEMD

29.7

20

5

93.50 %

93.75 %

From Table 4, we can get that the PEEMD method perform a lot than CEEMD method in calculating time and classification accuracies. It appears to be that the PEEMD method could overcome the defects of CEEMD and reduce computation complexity significantly. Moreover, the GAoptimized SVM diagnosis results indicate that the recognition accuracies of PCA selected faulty features are higher than using all features. The 20dimensional vector is reduced to 5dimensional feature vector, which indicate that the signals contain some useless and redundant information. And the PCA method can be used for feature extraction and dimensionality reduction effectively.
5.3. Discussion
In the rolling bearing experiment, the diagnosis accuracies of the proposed method mainly achieve 100 %. The results suggest that the proposed method is effective. We put forward the PEEMD and GAoptimized SVM diagnosis method in the marine propulsion shaft system at the first time. Results show that the classiﬁcation accuracies achieve more than 93 %. We confirm that the PEEMD can surmount the limitation of the CEEMD and can reduce the computation complexity significantly. The 20dimensional feature vector is reduced to 5dimensional feature vector through PCA method, and the SVM diagnosis accuracies of PCA selected faulty features are higher than using all features. It seems that the PCA method perform well in feature extraction and feature dimensionality reduction. In addition, the proposed method based on PEEMD, PCA and GAoptimized SVM perform well in the rolling bearing and stern bearing of marine propulsion shaft system which indicate that the method is effective. It should be noted that comparing with the rolling bearing faulty states classification accuracies which are almost 100 %, the stern bearing faulty conditions recognition accuracies are no greater than 94 %. However, these problems can be solved if we consider the noise in the vibration signal collected from the stern bearing.
6. Conclusions
In this paper, a novel fault diagnosis method based on PEEMD, PCA and SVM is presented. Firstly, the PEEMD method is employed for decomposing the vibration signal into IMF components. And the statistical features, energy and kurtosis, of the IMF components containing main faulty features are calculated for constructing the feature vector. Secondly, PCA is adopted for feature vector dimensions reduction. Finally, the GAoptimized SVM method is used for faulty condition recognition. The features extracted by this method had better distinction ability and cost less time, so it is more effective in faulty condition diagnosis. The validity of the proposed fault diagnosis method is veriﬁed by the application of practical experiments of the rolling bearing and stern bearing in the propulsion shaft system.
Acknowledgements
This research is supported by Natural Science Foundation of China (Grant No. 51409238).
References
 Peng Z. K., Chu F. L. Application of the wavelet transform in machine condition monitoring and fault diagnostics: a review with bibliography. Mechanical Systems and Signal Processing, Vol. 18, 2004, p. 199221. [Search CrossRef]
 Lei Y. G., et al. Fault diagnosis of rotating machinery based on a new hybrid clustering algorithm. International Journal of Advanced Manufacturing Technology, Vol. 35, 2008, p. 968977. [Search CrossRef]
 Zarei J., Poshtan J. An advanced Park’s vectors approach for bearing fault detection. Tribology International, Vol. 42, Issue 2, 2009, p. 213219. [Search CrossRef]
 Liu B., Riemenschneider S., Xu Y. Gearbox fault diagnosis using empirical mode decomposition and Hilbert spectrum. Mechanical Systems and Signal Processing, Vol. 20, Issue 3, 2006, p. 718734. [Search CrossRef]
 Purushotham V., Narayanan S., Prasad S. A. N. Multifault diagnosis of rolling bearing elements using wavelet analysis and hidden Markov model based fault recognition. NDT&E International, Vol. 38, 2005, p. 654664. [Search CrossRef]
 Li N., et al. Mechanical fault diagnosis based on redundant second generation wavelet packet transform, neighborhood rough set and support vector machine. Mechanical Systems and Signal Processing, Vol. 28, 2012, p. 608621. [Search CrossRef]
 Wu F. J., Qu L. S. Diagnosis of subharmonic faults of large rotating machinery based on EMD. Mechanical Systems and Signal Processing, Vol. 23, 2009, p. 467475. [Search CrossRef]
 Huang N. E., et al. The Empirical mode decomposition and the Hilbert spectrum for nonlinear and nonstationary time series analysis. Proceedings of the Royal Society of London, Vol. 12, 1998, p. 903995. [Search CrossRef]
 Huang N. E., Shen S. S. P. HilbertHuang Transform and Its Applications. World Scientific Publishing, Singapore, 2005. [Search CrossRef]
 Wu Z., Huang N. E. Ensemble empirical mode decomposition: a noise assisted data analysis method. Advances in Adaptive Data Analysis, Vol. 1, Issue 1, 2009, p. 141. [Search CrossRef]
 Yeh J. R., Shieh J. S. complementary ensemble empirical mode decomposition: a novel noise enhanced data analysis method. Advances in Adaptive Data Analysis, Vol. 2, Issue 2, 2010, p. 135156. [Search CrossRef]
 Zheng J. D., Cheng J. S., Yang Y. Partly ensemble empirical mode decomposition: an improved noiseassisted method for eliminating mode mixing. Signal Processing, Vol. 96, 2014, p. 362374. [Search CrossRef]
 Guo Q., Wu W., Massart D. L., et al. Feature selection in principal component analysis of analytical data. Chemometrics and Intelligent Laboratory Systems, Vol. 61, 2002, p. 123132. [Search CrossRef]
 Yuan ShengFa, Chu FuLei Support vector machinesbased fault diagnosis for turbopump rotor. Mechanical Systems and Signal Processing, Vol. 20, 2006, p. 939952. [Search CrossRef]
 Dong S. J., et al. A fault diagnosis method for rotating machinery based on PCA and Morlet kernel SVM. Mathematical Problems in Engineering, 2014, p. 19. [Search CrossRef]
 Samanta B., AlBalushi K. R., AlAraimi S. A. Artiﬁcial neural networks and support vector machines with genetic algorithm for bearing fault detection. Engineering Applications of Artiﬁcial Intelligence, Vol. 16, 2003, p. 657665. [Search CrossRef]
 Samanta B. Gear fault detection using artiﬁcial neural networks and support vector machines with genetic algorithms. Mechanical Systems and Signal Processing, Vol. 18, 2004, p. 625644. [Search CrossRef]
 Hsu C., Lin C. J. A comparison of methods for multiclass support vector machines. IEEE Transactions on Neural Networks, Vol. 13, Issue 2, 2002, p. 415425. [Search CrossRef]
 Hu Q., He Z. J., Zhang Z. S., et al. Fault diagnosis of rotating machinery based on improved wavelet package transform and SVMs ensemble. Mechanical Systems and Signal Processing, Vol. 21, 2007, p. 688705. [Search CrossRef]
 Zheng J. D., Cheng J. S., Yang Y. Modified EEMD algorithm and its application. Journal of Vibration and Shock, Vol. 32, Issue 21, 2013, p. 2126. [Search CrossRef]
 Vapnik V. The Nature of Statistics Learning Theory. Springer Verlag, New York, 1995, p. 2060. [Search CrossRef]
 Hsu C. W., Lin C. J. A comparison of methods for multiclass support vector machines. IEEE Transactions on Neural Networks, Vol. 13, Issue 2, 2002, p. 415425. [Search CrossRef]
 Liu D.,Niu D. X., Wang H., et al. Shortterm wind speed forecasting using wavelet transform and support vector machines optimized by genetic algorithm. Renewable Energy, Vol. 62, 2014, p. 592597. [Search CrossRef]
 http://csegroups.case.edu/bearingdatacenter/pages/downloaddatafile. [Search CrossRef]