TY - JOUR
T1 - Indentation of elastically anisotropic half-spaces by cones and parabolae of revolution
AU - Swadener, J.G.
AU - Pharr, G.M.
N1 - Copyright 2005 Elsevier Science B.V., Amsterdam. All rights reserved.
PY - 2001/2
Y1 - 2001/2
N2 - Indentation of ceramic materials with smooth indenters such as parabolae of revolution and spheres can be conducted in the elastic regime to relatively high loads. Ceramic single crystals thus provide excellent calibration media for load-and depth-sensing indentation testing; however, they are generally anisotropic and a complete elastic analysis is cumbersome. This study presents a simplified procedure for the determination of the stiffness of contact for the indentation of an anisotropic half-space by a rigid frictionless parabola of revolution which, to first order, approximates spherical indentation. Using a similar approach, a new procedure is developed for analysing conical indentation of anisotropic elastic media. For both indenter shapes, the contact is found to be elliptical, and equations are determined for the size, shape and orientation of the ellipse and the indentation modulus.
AB - Indentation of ceramic materials with smooth indenters such as parabolae of revolution and spheres can be conducted in the elastic regime to relatively high loads. Ceramic single crystals thus provide excellent calibration media for load-and depth-sensing indentation testing; however, they are generally anisotropic and a complete elastic analysis is cumbersome. This study presents a simplified procedure for the determination of the stiffness of contact for the indentation of an anisotropic half-space by a rigid frictionless parabola of revolution which, to first order, approximates spherical indentation. Using a similar approach, a new procedure is developed for analysing conical indentation of anisotropic elastic media. For both indenter shapes, the contact is found to be elliptical, and equations are determined for the size, shape and orientation of the ellipse and the indentation modulus.
UR - http://www.scopus.com/inward/record.url?scp=0035262942&partnerID=8YFLogxK
UR - http://www.tandfonline.com/10.1080/01418610108214314
U2 - 10.1080/01418610108214314
DO - 10.1080/01418610108214314
M3 - Article
AN - SCOPUS:0035262942
SN - 0141-8610
VL - 81
SP - 447
EP - 466
JO - Philosophical Magazine A
JF - Philosophical Magazine A
IS - 2
ER -