An efficient and quadratic accurate linear-gradient smoothing integration scheme for meshfree Galerkin methods
From MaRDI portal
Publication:1980194
DOI10.1016/j.enganabound.2021.07.006OpenAlexW3187089022MaRDI QIDQ1980194
Publication date: 3 September 2021
Published in: Engineering Analysis with Boundary Elements (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.enganabound.2021.07.006
Cites Work
- Unnamed Item
- Unnamed Item
- Quadratically consistent one-point (QC1) quadrature for meshfree Galerkin methods
- A moving Kriging interpolation-based element-free Galerkin method for structural dynamic analysis
- Element-free Galerkin methods for static and dynamic fracture
- Stable particle methods based on Lagrangian kernels
- Imposing essential boundary conditions in mesh-free methods
- A smoothed finite element method for mechanics problems
- A three-dimensional meshfree method for continuous multiple-crack initiation, propagation and junction in statics and dynamics
- A gradient smoothing method (GSM) with directional correction for solid mechanics problems
- Extrapolation methods theory and practice
- A Lagrangian reproducing kernel particle method for metal forming analysis
- Meshless methods: An overview and recent developments
- Nodal integration of the element-free Galerkin method
- Dispersion and pollution of meshless solutions for the Helmholtz equation
- A four-point integration scheme with quadratic exactness for three-dimensional element-free Galerkin method based on variationally consistent formulation
- A coupled finite element -- element-free Galerkin method
- A two-level nesting smoothed meshfree method for structural dynamic analysis
- A novel node-based smoothed finite element method with linear strain fields for static, free and forced vibration analyses of solids
- An inherently consistent reproducing kernel gradient smoothing framework toward efficient Galerkin meshfree formulation with explicit quadrature
- A nesting cell-based smoothed radial point interpolation method with two-level smoothed strains for static, free and forced vibration analysis of solids
- CS-IGA: a new cell-based smoothed isogeometric analysis for 2D computational mechanics problems
- Quadratic maximum-entropy serendipity shape functions for arbitrary planar polygons
- XLME interpolants, a seamless bridge between XFEM and enriched meshless methods
- An efficient nesting sub-domain gradient smoothing integration algorithm with quadratic exactness for Galerkin meshfree methods
- Second-order accurate derivatives and integration schemes for meshfree methods
- An arbitrary order variationally consistent integration for Galerkin meshfree methods
- Stabilized conforming nodal integration in the natural-element method
- A GENERALIZED GRADIENT SMOOTHING TECHNIQUE AND THE SMOOTHED BILINEAR FORM FOR GALERKIN FORMULATION OF A WIDE CLASS OF COMPUTATIONAL METHODS
- Meshfree and finite element nodal integration methods
- Exact formulae for areas, volumes and moments of polygons and polyhedra
- Element‐free Galerkin methods
- Non-linear version of stabilized conforming nodal integration for Galerkin mesh-free methods
- A point interpolation meshless method based on radial basis functions
- Reproducing kernel particle methods for structural dynamics
- Reproducing kernel particle methods
- A G space theory and a weakened weak (W2 ) form for a unified formulation of compatible and incompatible methods: Part I theory
- A G space theory and a weakened weak (W2 ) form for a unified formulation of compatible and incompatible methods: Part II applications to solid mechanics problems
- A local point interpolation method for static and dynamic analysis of thin beams
This page was built for publication: An efficient and quadratic accurate linear-gradient smoothing integration scheme for meshfree Galerkin methods
