View Seminar Paper: Boundary Element Analysis of Bimaterials Using Anisotropic Elastic
Citation:
Berger, J. R. (1994). Boundary Element Analysis of Bimaterials Using Anisotropic Elastic. Boulder, Colorado:National Institute of Standards and Technology, Technology Administration, U.S. Department of Commerce..
The boundary integral equations incorporating the Green's function for anisotropic solids containing planar interfaces are presented. The fundamental displacement and traction
solutions are determined from the displacement Green's function of Tewary, Wagoner, and Hirth [Journal of Materials Research, Vol. 4, pp.113-123]. The fundamental solutions are shown to
numerically degenerate to the Kelvin solution in the homogeneous, isotropic limit. The boundary integral equations are formulated with the use of constant boundary elements. The constant elements
allow for analytic evaluation of the boundary integrals. The application of the method is demonstrated by analyzing a copper-nickel system subjected to mechanical load.
Publisher
National Institute of Standards and Technology, Technology Administration, U.S. Department of Commerce.
Date
1994-04-14
Copyright Notice
http://www.nist.gov/public_affairs/disclaim.htm
Seminar Series
NIST workshop on Green’s functions and boundary element analysis
Institution
National Institute of Standards and Technology
Location
Boulder, Colorado
Copyright Agreement
on
Additional Notes
Proceedings of the NIST workshop on Green’s functions and boundary element analysis published as NIST Special Publication SP 910 (1996)
Guest - January 09, 2009
View Seminar Paper: Boundary Element Analysis of Bimaterials Using Anisotropic Elastic 