Digital images are increasingly being used as input data for computational analyses. This study presents an efficient numerical technique to perform image-based elastoplastic analysis of materials and structures. The quadtree decomposition algorithm is employed for image-based mesh generation, which is fully automatic and highly efficient. The quadtree cells are modeled by scaled boundary polytope elements, which eliminate the issue of hanging nodes faced by standard finite elements. A novel, simple, and efficient scaled boundary elastoplastic formulation with stablisation is developed. In this formulation, the return-mapping calculation is only required to be performed at a single point in a polytope element, which facilitates the computat...
In this paper we present a semi-multiscale methodology, where a micrograph is split into multiple in...
FE-models for structural solid mechanics analyses can be readily generated from computer images via ...
Three different displacement based finite element formulations over arbitrary polygons are studied i...
Digital imaging technology is increasingly being applied in material, biomedical and other disciplin...
This paper presents a numerical technique for geotechnical slope stability analysis, integrating dig...
Computational structural analysis, primarily the finite element method (FEM), has been widely applie...
The quadtree is a hierarchical-type data structure where each parent is recursively divided into fou...
A novel polygon based numerical technique is formulated using the scaled boundary finite element met...
This paper presents a method to improve the computational efficiency of the scaled boundary finite e...
An adaptive automatic cell generation for elasto-plastic problems has been developed which eliminate...
A crack propagation modelling technique combining the scaled boundary finite element method and quad...
Octree (and quadtree) representations of computational geometry are particularly well suited to mode...
In this paper, we present an efficient computational procedure to model dynamic fracture within the ...
In this paper, an adaptive refinement technique using the scaled boundary finite element method (SBF...
A numerical algorithm is developed for solving the boundary integral equations for two dimensional i...
In this paper we present a semi-multiscale methodology, where a micrograph is split into multiple in...
FE-models for structural solid mechanics analyses can be readily generated from computer images via ...
Three different displacement based finite element formulations over arbitrary polygons are studied i...
Digital imaging technology is increasingly being applied in material, biomedical and other disciplin...
This paper presents a numerical technique for geotechnical slope stability analysis, integrating dig...
Computational structural analysis, primarily the finite element method (FEM), has been widely applie...
The quadtree is a hierarchical-type data structure where each parent is recursively divided into fou...
A novel polygon based numerical technique is formulated using the scaled boundary finite element met...
This paper presents a method to improve the computational efficiency of the scaled boundary finite e...
An adaptive automatic cell generation for elasto-plastic problems has been developed which eliminate...
A crack propagation modelling technique combining the scaled boundary finite element method and quad...
Octree (and quadtree) representations of computational geometry are particularly well suited to mode...
In this paper, we present an efficient computational procedure to model dynamic fracture within the ...
In this paper, an adaptive refinement technique using the scaled boundary finite element method (SBF...
A numerical algorithm is developed for solving the boundary integral equations for two dimensional i...
In this paper we present a semi-multiscale methodology, where a micrograph is split into multiple in...
FE-models for structural solid mechanics analyses can be readily generated from computer images via ...
Three different displacement based finite element formulations over arbitrary polygons are studied i...