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FATIGUE PROPAGATION OF SURFACE FLAWS IN ROUND BARS: A THREE‐PARAMETER THEORETICAL MODEL
Author(s) -
Carpinteri Andrea,
Brighenti Roberto
Publication year - 1996
Publication title -
fatigue and fracture of engineering materials and structures
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.887
H-Index - 84
eISSN - 1460-2695
pISSN - 8756-758X
DOI - 10.1111/j.1460-2695.1996.tb00182.x
Subject(s) - ellipse , bar (unit) , circumference , geometry , enhanced data rates for gsm evolution , fracture mechanics , bending , surface (topology) , amplitude , constant (computer programming) , point (geometry) , plane (geometry) , materials science , structural engineering , mathematics , mechanics , engineering , optics , physics , meteorology , computer science , programming language , telecommunications
A three‐parameter fracture mechanics model is proposed to theoretically analyse the propagation of an elliptical‐arc part‐through flaw in a round bar subjected to constant cyclic amplitude axial or bending loads. The edge flaw presents an aspect ratio α= a el / b el ( a el , b el = ellipse semi‐axes) and a relative crack depth ζ= a/D , where a and D are the depth of the deepest point on the crack front and the bar diameter, respectively. Additionally a parameter s = a el / a (ellipse shifting) defines the distance of the ellipse centre from the bar circumference. The surface flaw growth occurs according to preferred patterns which tend to converge to an inclined asymptotic plane in the diagram of α against s and ζ.