Litcius/Paper detail

Multifractional Brownian Motion and Quantum-Behaved Partial Swarm Optimization for Bearing Degradation Forecasting

Wanqing Song, Xiaoxian Chen, Carlo Cattani, Enrico Zio

2020Complexity34 citationsDOIOpen Access PDF

Abstract

Gradual degradation of the bearing vibration signal is usually studied as a nonstationary stochastic time series. Roller bearings are working at high speed in a heavy load environment so that the combination of bearing faults gradually degraded during the rotation might lead to unpredicted catastrophic accidents. The degradation process has the property of long-range dependence (LRD), so that the fractional Brownian motion (fBm) is taken into account for a prediction model. Because of the dramatic changes in the bearing degradation process, the Hurst exponent that describes the fBm will change during the degradation process. A priori Hurst value of the conventional fBm in the prediction is fixed, thus inducing a minor accuracy of the prediction. To avoid this problem, we propose an improved prediction method. Based on the following steps, at the initial data processing, a skip-over factor is selected as the characteristics parameter of the bearing degradation process. A multifractional Brownian motion (mfBm) replaces the fBm for the degradation modeling. We will show that also our mfBm has the same property of long-range dependence as the fBm. Moreover, a time-varying Hurst exponent H ( t ) is taken to replace the constant H in fBm. Finally, we apply the quantum-behaved partial swarm optimization (QPSO) to optimize H ( t ) for a finite interval. Some tests and corresponding experimental results will show that our model QPSO + mfBm have a much better performance on the prediction effect than fBm.

Topics & Concepts

Hurst exponentFractional Brownian motionDetrended fluctuation analysisBrownian motionBearing (navigation)Rescaled rangeStochastic processRange (aeronautics)Computer scienceDegradation (telecommunications)MathematicsApplied mathematicsMathematical optimizationStatistical physicsStatisticsPhysicsScalingArtificial intelligenceEngineeringAerospace engineeringTelecommunicationsGeometryMachine Fault Diagnosis TechniquesGear and Bearing Dynamics AnalysisLubricants and Their Additives