Triangular Bézier surface patches in modeling shape of boundary geometry for potential problems in 3D

Applied Mathematical Modelling

2015

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a b s t r a c tThe paper presents the approximation strategy for solutions and derivatives of solutions of boundary value problems on the example of two-dimensional solids. The effectiveness of the proposed strategy lies in the fact that it gives possibility to calculate solutions and their derivatives continuously at all points of the boundary and the domain, irrespective of the method used to solve the boundary problem and regardless of the type of the problem. The strategy has been developed in order to: (1) improve the accuracy of solutions (displacement) and their derivatives (strains, stresses) in the vicinity of the boundary, where they are affected by errors, (2) make the ability to directly obtain the derivatives of solutions (strains, stresses) on the boundary, (3) avoid computing strongly singular integrals present in the integral identity used for obtaining solutions or their derivatives (e.g. stresses in plasticity problems). The different variants of the proposed strategy have been developed and their accuracy has been verified considering examples with analytical solutions.

Section: Interpolation Using Seriesmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Numerical approximation strategy for solutions and their derivatives for two-dimensional solids

Bołtuć

Applied Mathematical Modelling

2015

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“…After substituting (20), (21), and (22) in (18), we obtain the following system of the convolution integral equations…”

Section: B the Definition Of The Smooth Contour Integral By Surface mentioning

confidence: 99%

“…After substituting (34), (35), for (23) and their simplification in agreement with the earlier terminology [20,21], we obtain the formula termed parametric integral equation system (PIES) in the following form…”

Section: Parametric Integral Equation System (Pies)mentioning

confidence: 99%

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Nonelement boundary representation with Bézier surface patches for 3D linear elasticity problems in parametric integral equation system (PIES) and its solving using Lagrange polynomials

Numerical Methods Partial

Szerszeń

2017

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In this article, we present a strategy of using rectangular and triangular Bézier surface patches for nonelement representation of 3D boundary geometries for problems of linear elasticity. The boundary generated in this way is directly incorporated in the parametric integral equation system (PIES), which has been developed by the authors. The boundary values on each surface patch are approximated by Lagrange polynomials. Three illustrative examples are presented to confirm the effectiveness of the proposed boundary representation in connection with PIES and to show good accuracy of numerical results.

Modification of the boundary integral equation for the Navier–Lamé equations in 2D elastoplastic problems and its numerical solving

Numerical Meth Engineering

Bołtuć

2017

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Summary The paper presents the generalization of the modification of classical boundary integral equation and obtaining parametric integral equation system for 2D elastoplastic problems. The modification was made to obtain such equations for which numerical solving does not require application of finite or boundary elements. This was achieved through the use of curves and surfaces for modeling introduced at the stage of analytical modification of the classic boundary integral equation. For approximation of plastic strains the Lagrange polynomials with various number and arrangement of interpolation nodes were used. Reliability of the modification was verified on examples with analytical solutions. Copyright © 2016 John Wiley & Sons, Ltd.