论文信息 - The boundary contour method for three-dimensional linear elasticity with a new quadratic boundary element

The boundary contour method for three-dimensional linear elasticity with a new quadratic boundary element

This paper presents further developments of the Boundary Contour Method (BCM) for three-dimensional (3-D) linear elasticity. A hallmark of the BCM is that surface integrals on boundary elements of the usual Boundary Element Method (BEM) are transformed, through an application of Stokes' theorem, into line integrals on the boundary contours of these elements. The specific contributions of the present work are: (a) explicit use of the rigid body mode to regularize the BCM and avoid computation of the corner tensor and (b) incorporation of an improved quadratic boundary element. New numerical results on bodies with curved surfaces, obtained from BCM, are uniformly accurate.

[1] E. Lutz. Systematic derivation of contour integration formulae for laplace and elastostatic gradient BIE's , 1994, Computational Mechanics.

[2] E. Lutz,et al. Numerical Methods for Hypersingular and Near-Singular Boundary Integrals in Fracture Mechanics , 1991 .

[3] Subrata Mukherjee,et al. Boundary element methods in creep and fracture , 1982 .

[4] S. Mukherjee,et al. The boundary contour method for two-dimensional linear elasticity with quadratic boundary elements , 1997 .

[5] P. K. Banerjee. The Boundary Element Methods in Engineering , 1994 .

[6] S. Timoshenko,et al. Theory of elasticity , 1975 .

[7] Subrata Mukherjee,et al. The Boundary Contour Method for Three-Dimensional Linear Elasticity , 1996 .

[8] F. B. Hildebrand. Advanced Calculus for Applications , 1962 .

[9] Frank J. Rizzo,et al. An integral equation approach to boundary value problems of classical elastostatics , 1967 .

[10] V. Mantič. A new formula for the C-matrix in the Somigliana identity , 1993 .

[11] Subrata Mukherjee,et al. A new boundary element method formulation for three dimensional problems in linear elasticity , 1987 .