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Localized Method of Fundamental Solutions for Three-Dimensional Elasticity Problems: Theory

Yan Gu, Chia‐Ming Fan, Zhuojia Fu

2021Advances in Applied Mathematics and Mechanics52 citationsDOIOpen Access PDF

Abstract

A localized version of the method of fundamental solution (LMFS) is devised in this paper for the numerical solutions of three-dimensional (3D) elasticity problems. The present method combines the advantages of high computational efficiency of localized discretization schemes and the pseudo-spectral convergence rate of the classical MFS formulation. Such a combination will be an important improvement to the classical MFS for complicated and large-scale engineering simulations. Numerical examples with up to 100,000 unknowns can be solved without any difficulty on a personal computer using the developed methodologies. The advantages, disadvantages and potential applications of the proposed method, as compared with the classical MFS and boundary element method (BEM), are discussed.

Topics & Concepts

Method of fundamental solutionsDiscretizationElasticity (physics)Boundary element methodComputer scienceConvergence (economics)Rate of convergenceNumerical analysisBoundary value problemApplied mathematicsFinite element methodMathematical optimizationSpectral methodMathematicsSingular boundary methodMathematical analysisPhysicsThermodynamicsComputer networkEconomic growthEconomicsChannel (broadcasting)Numerical methods in engineeringElectromagnetic Simulation and Numerical MethodsAcoustic Wave Phenomena Research
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