Micro-macro relations for fatigue crack growth

A review of several statistical and probabilistic approaches to the problem of fatigue crack growth shows that many Markov models are equivalent in that they express the probability density of the crack length at time t as solutions of the Kolmogorov, or Fokker-Plank, equations. Further, it is shown

Abstmtet-A probabilistic model for prediing fatigue crack growth rate and cycles to reach a given crack iength is presented. The stochastic chamcterixations of cmok growth parameters c and m in the Paris-Erdogan and Forman Iaws are investigated based upon crack growth experiments. According to the s

in this paper, three reliability methods (1) a first order reliability method (FORM) based on the total derivative method (TDM), (2) FORM based on the Lagrange multiplier formulation (LMF) and (3) a Monte Carlo Simulation (MCS) with pseudo-exact sampling technique are applied to curvilinear fatigue