Abstract
The Modified Local Green's Function Method (MLGFM) is an integral technique that has been used to solve several problems of continuum mechanics in the last decade. This method may be understood as an extension of the Galerkin Boundary Element Method, and its main feature is to make use of the properties of a Green's Function projection associated to the problem, without its explicit knowledge. A preceding paper, accompanying this one, presented the MLGFM formulation. In this work, some numerical examples explain important points of the method, e.g. flux convergence, processing time, application to uni- and multicellular bidimensional potential problems, unicellular bidimensional elasticity and unicellular Mindlin plates bending.
Published Version
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