Roman Vodička scite author profile

The solution of a Dirichlet boundary value problem of plane isotropic elasticity by the boundary integral equation (BIE) of the first kind obtained from the Somigliana identity is considered. The logarithmic function appearing in the integral kernel leads to the possibility of this operator being non-invertible, the solution of the BIE either being nonunique or not existing. Such a situation occurs if the size of the boundary coincides with the so-called critical (or degenerate) scale for a certain form of the fundamental solution used. Techniques for the evaluation of these critical scales and for the removal of the non-uniqueness appearing in the problems with critical scales solved by the BIE of the first kind are proposed and analysed, and some recommendations for BEM code programmers based on the analysis presented are given.

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Note on the removal of rigid body motions in the solution of elastostatic traction boundary value problems by SGBEM

Vodička¹,

Mantič²,

Parı́s³

2006

Engineering Analysis with Boundary Elements

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Roman Vodička

On Invertibility of Elastic Single-Layer Potential Operator

Energetic versus maximally-dissipative local solutions of a quasi-static rate-independent mixed-mode delamination model

A quasi-static interface damage model with cohesive cracks: SQP–SGBEM implementation

On solvability of a boundary integral equation of the first kind for Dirichlet boundary value problems in plane elasticity

Note on the removal of rigid body motions in the solution of elastostatic traction boundary value problems by SGBEM

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