
doi: 10.1002/nme.910
AbstractThe solutions of the displacement boundary integral equation (BIE) are not uniquely determined in certain types of boundary conditions. Traction boundary integral equations that have unique solutions in these traction and mixed boundary cases are established. For two‐dimensional linear elasticity problems, the divergence‐free property of the traction boundary integral equation is established. By applying Stokes' theorem, unknown tractions or displacements can be reduced to computation of traction integral potential functions at the boundary points. The same is true of the J integral: it is divergence‐free and the evaluation of the J integral can be inverted into the computation of the J integral potential functions at the boundary points of the cracked body. The J integral can be expressed as the linear combination of the tractions and displacements from the traction BIE on the boundary of the cracked body. Numerical integrals are not needed at all. Selected examples are presented to demonstrate the validity of the traction boundary integral and J integral. Copyright © 2004 John Wiley & Sons, Ltd.
Brittle fracture, Classical linear elasticity, linear elasticity, traction boundary integral equation, Boundary element methods applied to problems in solid mechanics, \(J\) integral
Brittle fracture, Classical linear elasticity, linear elasticity, traction boundary integral equation, Boundary element methods applied to problems in solid mechanics, \(J\) integral
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