Static and dynamic analysis of plane elasticity using complex Fourier manifold method based on numerical improvement of Gauss-Legendre quadrature techniques
From MaRDI portal
Publication:2085930
DOI10.1016/j.enganabound.2022.06.022OpenAlexW4284977295WikidataQ113875184 ScholiaQ113875184MaRDI QIDQ2085930
Publication date: 19 October 2022
Published in: Engineering Analysis with Boundary Elements (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.enganabound.2022.06.022
elastostatic and elastodynamic problemsGaussian Legendre quadraturehigh order numerical manifold method (HONMM)non-polynomial integrandsimplex integrationthree-node complex Fourier shape function
Cites Work
- Generalized Gaussian quadrature rules for discontinuities and crack singularities in the extended finite element method
- Prediction of rank deficiency in partition of unity-based methods with plane triangular or quadrilateral meshes
- A new way to treat material discontinuities in the numerical manifold method
- A partition-of-unity based `FE-meshfree' QUAD4 element with radial-polynomial basis functions for static analyses
- Enhanced nodal gradient finite elements with new numerical integration schemes for 2D and 3D geometrically nonlinear analysis
- On the optimal shape parameters of radial basis functions used for 2-D meshless methods
- Dynamic analysis of plane elasticity with new complex Fourier radial basis functions in the dual reciprocity boundary element method
- A novel numerical manifold method with derivative degrees of freedom and without linear dependence
- Structured mesh refinement in MLS-based numerical manifold method and its application to crack problems
- Improved numerical manifold method (iNMM) -- an extra-DOF free and interpolating NMM with continuous nodal stress
- Complex Fourier element shape functions for analysis of 2D static and transient dynamic problems using dual reciprocity boundary element method
- Symmetric quadrature rules on a triangle
- Some studies on dual reciprocity BEM for elastodynamic analysis
- A dual reciprocity BEM approach using new Fourier radial basis functions applied to 2D elastodynamic transient analysis
- A high-order numerical manifold method with continuous stress/strain field
- A new insight into the analysis of plane elasticity with coupling of numerical manifold and boundary element methods
- A numerical integration strategy of meshless numerical manifold method based on physical cover and applications to linear elastic fractures
- Quadrilateral-area-coordinate-based numerical manifold method accommodating static and dynamic analysis
- A new recursive formula for integration of polynomial over simplex
- Alternative proposal of the high-order Gauss quadrature for reference triangle in the generalized finite element method
- A four-way enhanced numerical manifold method for crack propagation and failure analysis of rock slopes
- A time-dependent discontinuous Galerkin finite element approach in two-dimensional elastodynamic problems based on spherical Hankel element framework
- Numerical manifold method for vibration analysis of Kirchhoff's plates of arbitrary geometry
- A rigorous and unified mass lumping scheme for higher-order elements
- Symmetric Gauss Legendre quadrature formulas for composite numerical integration over a triangular surface
- On the application of two Gauss-Legendre quadrature rules for composite numerical integration over a tetrahedral region
- New complex Fourier shape functions for the analysis of two-dimensional potential problems using boundary element method
- New strategies for some issues of numerical manifold method in simulation of crack propagation
- Dynamic high order numerical manifold method based on weighted residual method
- Numerical Integration Over Simplexes and Cones
- Generalized nodes and high-performance elements
- High degree efficient symmetrical Gaussian quadrature rules for the triangle
- Quadrature Over a Pyramid or Cube of Integrands with a Singularity at a Vertex
- Extended numerical integration method for triangular surfaces
- Development of high-order manifold method
- Generalized Gaussian quadrature rules on arbitrary polygons
- Gaussian quadrature formulas for triangles
This page was built for publication: Static and dynamic analysis of plane elasticity using complex Fourier manifold method based on numerical improvement of Gauss-Legendre quadrature techniques
