In this paper, the time to reach any given crack size in fatigue testing is directly modeled as a stochastic process. In particular, a gamma process with non-stationary independent increments is assumed for each specimen, where the shape parameter is a suitable function of the crack length. Then, the variability across specimens is accounted for by assuming that the scale parameter is a gamma random variable, resulting in simple mathematical forms for the distribution of service time, its mean and variance. The correlation between the Paris law parameters C and m is also revisited and some useful results are given.
A gamma process model for the analysis of fatigue crack growth data / Guida, Maurizio; Penta, Francesco. - In: ENGINEERING FRACTURE MECHANICS. - ISSN 0013-7944. - 142:(2015), pp. 21-49. [10.1016/j.engfracmech.2015.05.027]
A gamma process model for the analysis of fatigue crack growth data
PENTA, FRANCESCO
2015
Abstract
In this paper, the time to reach any given crack size in fatigue testing is directly modeled as a stochastic process. In particular, a gamma process with non-stationary independent increments is assumed for each specimen, where the shape parameter is a suitable function of the crack length. Then, the variability across specimens is accounted for by assuming that the scale parameter is a gamma random variable, resulting in simple mathematical forms for the distribution of service time, its mean and variance. The correlation between the Paris law parameters C and m is also revisited and some useful results are given.| File | Dimensione | Formato | |
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