This article presents statistical model parameter identification using Bayesian inference when parameters are correlated and observed data have noise and bias. The method is explained using the Paris model that describes crack growth in a plate under mode I loading. It is assumed that the observed data are obtained through structural health monitoring systems, which may have random noise and deterministic bias. It was found that a strong correlation exists (a) between two parameters of the Paris model, and (b) between initially measured crack size and bias. As the level of noise increases, the Bayesian inference was not able to identify the correlated parameters. However, the remaining useful life was predicted accurately because the identification errors in correlated parameters were compensated by each other. It was also found that the Bayesian identification process converges slowly when the level of noise is high.
GiurgiutiuV. Structural health monitoring with piezoelectric wafer active sensors. Burlington, MA: Academic Press (an Imprint of Elsevier), 2008.
2.
SchwabacherMA. A survey of data-driven prognostics. In: AIAA Infotech@Aerospace Conference, Reston, VA, 2005.
3.
LuoJPattipatiKRQiaoLChigusaS. Model-based prognostic techniques applied to a suspension system. IEEE Trans Syst Man Cyber2008; 38(5): 1156–1168.
4.
YanJLeeJ. A hybrid method for on-line performance assessment and life prediction in drilling operations. In: IEEE International Conference on Automation and Logistics, Jinan, Shandong, China, August 18–21, 2007.
5.
ParisPCErdoganF. A critical analysis of crack propagation laws. ASME J Basic Eng1963; 85: 528–534.
6.
YuWKHarrisTA. A new stress-based fatigue life model for ball bearings. Tribol Trans2001; 44: 11–18.
7.
JawLCIncSMTempeAZ. Neural networks for model-based prognostics. In: IEEE Aerospace Conference, Snowmass at Aspen, Colorado, March 6–13, 1999.
8.
OrchardMVachtsevanosG. A particle filtering approach for on-line failure prognosis in a planetary carrier plate. Int J Fuzzy Logic Intell Syst2007; 7(4): 221–227.
9.
OrchardM.KacprzynskiG.GoebelK.SahaB.VachtsevanosG. (2008). Advances in uncertainty representation and management for particle filtering applied to prognostics. In: International Conference on Prognostics and Health Management, Denver, CO.
10.
ZioEPeloniG. Particle filtering prognostic estimation of the remaining useful life of nonlinear components. Reliab Eng Syst Safety2011; 96(3): 403–409.
11.
SheppardJWKaufmanMAIncAAnnapolisMD. Bayesian diagnosis and prognosis using instrument uncertainty. IEEE Autotestcon, 2005 Conference Record, Orlando, Florida, September 25–29, 2005, pp. 417–423.
12.
SahaBGoebelK. Uncertainty management for diagnostics and prognostics of batteries using Bayesian techniques. In: IEEE Aerospace Conference, Big Sky, Montana, March 1–8, 2008.
13.
SankararamanSLingYMahadevanS. Confidence assessment in fatigue damage prognosis. In: Annual Conference of the Prognostics and Health Management Society, Portland, Oregon, October 10–16, 2010.
14.
LingYShantzCSankararamanSMahadevanS. Stochastic characterization and update of fatigue loading for mechanical damage prognosis. In: Annual Conference of the Prognostics and Health Management Society, Portland, Oregon, October 10–16, 2010.
15.
ParisPCLadosDTadaH. Reflections on identifying the real ΔKeffective in the threshold region and beyond. Int J Fatigue2008; 75: 299–305.
16.
BechhoeferE. A method for generalized prognostics of a component using Paris law. In: Proceedings of the American Helicopter Society 64thAnnual Forum, Montreal, CA.
17.
AndrieuCFreitas, deNDoucetAJordanM. An introduction to MCMC for machine learning. Machine Learning2003; 50(1): 5–43.
18.
VirklerDAHillberryBMGoelPK. The statistical nature of fatigue crack propagation. ASME J Eng Mater Technol1979; 101: 148–153.
19.
NewmanJCJrPhillipsEPSwainMH. Fatigue-life prediction methodology using small-crack theory. Int J Fatigue1999; 21: 109–119.
20.
SinclairGBPierieRV. On obtaining fatigue crack growth parameters from the literature. Int J Fatigue1990; 12(1): 57–62.
21.
LiuYMahadevanS. Probabilistic fatigue life prediction using an equivalent initial flaw size distribution. Int J Fatigue2009; 31(3): 476–487.
22.
CoppeAHaftkaRTKimNH. Least squares-filtered Bayesian updating for remaining useful life estimation. In: 12th AIAA Non-Deterministic Approaches Conference, Orlando, FL.
23.
CoppeAHaftkaRTKimNHYuanFG. Uncertainty reduction of damage growth properties using structural health monitoring. J Aircraft2010; 47(6): 2030–2038.
24.
BayesT. An essay towards solving a problem in the doctrine of chances. Phil Trans Roy Soc Lond1763; 53: 370–418.
25.
CarpinteriAPaggiM. Are the Paris’ law parameters dependent on each other?Frattura ed Integrità Strutturale2007; 2: 10–16.
26.
RiceJ. Mathematical statistics and data analysis, 2nd edn.Belmont, CA: Duxbury Press, 1995.
