Issue 42

P. J. Huffman et alii, Frattura ed Integrità Strutturale, 42 (2017) 74-84; DOI: 10.3221/IGF-ESIS.42.09 84 [13] Correia, J.A.F.O., De Jesus, A.M.P., Moreira, P.M.G.P., Calçada, R.A.B., Fernández-Canteli, A., Fatigue Crack Propagation Rates Prediction Using Probabilistic Strain-Based Approaches, Chapter 11, pp. 245-273, in: Fracture Mechanics – Properties, Patterns and Behaviours, Lucas Alves (Ed.), (2016). [14] Hafezi, M.H., Abdullah, N.N., Correia, J.A.F.O., De Jesus, A.M.P., An assessment of a strain-life approach for fatigue crack growth, International Journal of Structural Integrity, 3(2) (2012) 344–376. [15] Correia, J.A.F.O., De Jesus, A.M.P., Ribeiro, A.S., Strain-based approach for fatigue crack propagation simulation of the 6061-T651 aluminum alloy, International Journal of Materials and Structural Integrity, (2017, in press). [16] Smith, K.N., Watson, P., Topper, T.H., A Stress-Strain Function for the Fatigue of Metals, Journal of Materials, 5(4) (1970) 767-778. [17] Sampayo, L.M.C.M.V., Monteiro, P.M.F., Correia, J.A.F.O., Xavier, J.M.C., De Jesus, A.M.P., Fernandez-Canteli, A., Calçada, R.A.B., Probabilistic S-N field assessment for a notched plate made of puddle iron from the Eiffel bridge with an elliptical hole, Procedia Engineering, 114 (2015) 691 – 698. [18] Raposo, P., Correia, J.A.F.O., De Jesus, A.M.P., Calçada, R.A.B., Lesiuk, G., Hebdon, M., Fernández-Canteli, A., Probabilistic fatigue S-N curves derivation for notched components, Frattura ed Integrità Strutturale, (2017, in press). [19] Neuber, H., Theory of stress concentration for shear-strained prismatic bodies with arbitrary nonlinear stress–strain law. Trans. ASME Journal of Applied Mechanics, 28 (1961) 544–551. [20] Moftakhar A, Buczynski A, Glinka G. Calculation of elasto-plastic strains and stresses in notches under multiaxial loading. International Journal of Fracture, 70 (1995) 357-373. [21] Reinhard W, Moftakhar A, Glinka G. An Efficient Method for Calculating Multiaxial Elasto-Plastic Notch Tip Strains and Stresses under Proportional Loading. Fatigue and Fracture Mechanics, Vol. 27, ASTM STP 1296, R.S. Piascik, J.C. Newman, N.E. Dowling, Eds., American Society for Testing and Materials, (1997) 613-629. [22] Huffman, P., Correia, J.A.F.O., Mikheevskiy, S., De Jesus, A.M.P., Cicero, S., Fernández-Canteli, A., Berto, F., Glinka, G., Fatigue evaluation of notched details based on unified local probabilistic approaches, International Symposium on Notch Fracture (ISNF2017), Santander, Spain, (2017). [23] Castillo, E., Fernández-Canteli, A., A Unified Statistical Methodology for Modeling Fatigue Damage, Springer, 2009. [24] Ramberg, W., Osgood, W.R., Description of the stress-strain curves by the three parameters, NACA TN-902, National Advisory Committee for Aeronautics, (1943). [25] De Jesus, A.M.P., Ribeiro, A.S., Fernandes, A.A., Influence of the submerged arc welding in the mechanical behaviour of the P355NL1 steel—Part II: Analysis of the Low/High Cycle Fatigue Behaviours, J. Mater. Sci., 42 (2007) 5973–5981. [26] Correia, J.A.F.O., De Jesus, A.M.P., Moreira, P.M.G.P., Tavares, P.J., Crack closure effects on fatigue crack propagation rates: application of a proposed theoretical model, Advances in Materials Science and Engineering, (2016) 3026745. [27] ASTM – American Society for Testing and Materials. ASTM E606-92: standard practice for strain controlled fatigue testing. In: Annual book of ASTM standards, part 10; (1998) 557–571. [28] Coffin, L.F., A study of the effects of the cyclic thermal stresses on a ductile metal, Trans ASME, 76 (1954) 931–950. [29] Manson, S.S., Behaviour of materials under conditions of thermal stress, NACA TN-1170, National Advisory Committee for Aeronautics, Report 1170, (1954) 591–630. [30] Morrow, J.D., Cyclic plastic strain energy and fatigue of metals, Int Frict Damp Cyclic Plast ASTM STP., 378 (1965) 45–87. [31] ASTM—American Society for Testing and Materials. ASTM E647: standard test method for measurement of fatigue crack growth rates. In: Annual book of ASTM Standards, vol. 03.01. West Conshohocken, PA: ASTM—American Society for Testing and Materials; (2000) 591–630. [32] SAS, ANSYS, Swanson Analysis Systems, Inc., Houston, Version 12.0, (2011). [33] Glinka, G., Development of weight functions and computer integration procedures for calculating stress intensity factors around cracks subjected to complex stress fields. Progress Report No.1: Stress and Fatigue-Fracture Design, Petersburg Ontario, Canada, (1996).