2012
DOI: 10.1016/j.nucengdes.2012.08.024
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Low cycle fatigue life prediction of 316 L(N) stainless steel based on cyclic elasto-plastic response

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Cited by 77 publications
(49 citation statements)
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“…The Basquin and Coffin-Manson parameters are summarized in Table 1. These Coffin-Manson parameters are consistent with previous reports [25]. The optical microstructures of the AISI 316L stainless steel after fatigue failure under various strain amplitudes are shown in Figure 3, and they are compared with the microstructrue of the as-received specimen.…”
Section: Resultssupporting
confidence: 89%
“…The Basquin and Coffin-Manson parameters are summarized in Table 1. These Coffin-Manson parameters are consistent with previous reports [25]. The optical microstructures of the AISI 316L stainless steel after fatigue failure under various strain amplitudes are shown in Figure 3, and they are compared with the microstructrue of the as-received specimen.…”
Section: Resultssupporting
confidence: 89%
“…Roy et al studied cyclic hardening properties of 316L(N) at room temperature and performed elastic‐plastic finite element analysis to obtain hysteresis loops under repeated loadings. They estimated LCF lives based on the analysed plastic strain energy dissipation.…”
Section: Introductionmentioning
confidence: 99%
“…Here, the fatigue life means the cycle number to failure of a material specimen under cyclic loading with a macro uniform deformation. The Manson-Coffin equation (Manson, 1953;Coffin, 1954) or its modification was widely used by some researchers to predict fatigue life of materials (Ni and Mahadevan, 2004;Buciumeanu et al, 2011;Roy et al, 2012;Wu et al, 2014;Ince and Glinka, 2014). But the premise for using this equation is that a series of fatigue experiments of the material needs to be carried out to obtain the respective fitting parameters in the equation.…”
Section: Introductionmentioning
confidence: 99%