In this paper, a purely displacement-based formulation is presented within the framework of the scaled boundary finite element method to model compressible and nearly incompressible materials. A selective reduced integration technique combined with an analytical treatment in the nearly incompressible limit is employed to alleviate volumetric locking. The stiffness matrix is computed by solving the scaled boundary finite element equation. The salient feature of the proposed technique is that it neither requires a stabilization parameter nor adds additional degrees of freedom to handle volumetric locking. The efficiency and the robustness of the proposed approach is demonstrated by solving various numerical examples in two and three dimension...
A blocked Hamiltonian Schur decomposition is herein proposed for the solution process of the Scaled ...
A novel polygon based numerical technique is formulated using the scaled boundary finite element met...
In order to avoid the numerical difficulties in locally enforcing the incompressibility constraint u...
In this paper, a displacement based finite element framework for general three-dimensional convex po...
This study presents a mixed finite element formulation able to address nearly-incompressible problem...
Abstract. A nite element method is considered for dealing with nearly in-compressible material. In t...
A general technique to develop arbitrary-sided polygonal elements based on the scaled boundary finit...
We present a finite element method for nearly incompressible elasticity using a mixed formulation of...
We present two finite element methods for simplicial meshes to approximate the solution of the probl...
This paper promotes the development of a novel family of finite elements with smoothed strains, offe...
Incremental plane strain deformations superimposed upon a uniformly stressed and deformed nonlinear ...
Three different displacement based finite element formulations over arbitrary polygons are studied i...
Octree (and quadtree) representations of computational geometry are particularly well suited to mode...
We present a displacement based approach over arbitrary polytopes for compressible and nearly incomp...
The scaled boundary finite-element method is extended to simulate time-harmonic responses of non-hom...
A blocked Hamiltonian Schur decomposition is herein proposed for the solution process of the Scaled ...
A novel polygon based numerical technique is formulated using the scaled boundary finite element met...
In order to avoid the numerical difficulties in locally enforcing the incompressibility constraint u...
In this paper, a displacement based finite element framework for general three-dimensional convex po...
This study presents a mixed finite element formulation able to address nearly-incompressible problem...
Abstract. A nite element method is considered for dealing with nearly in-compressible material. In t...
A general technique to develop arbitrary-sided polygonal elements based on the scaled boundary finit...
We present a finite element method for nearly incompressible elasticity using a mixed formulation of...
We present two finite element methods for simplicial meshes to approximate the solution of the probl...
This paper promotes the development of a novel family of finite elements with smoothed strains, offe...
Incremental plane strain deformations superimposed upon a uniformly stressed and deformed nonlinear ...
Three different displacement based finite element formulations over arbitrary polygons are studied i...
Octree (and quadtree) representations of computational geometry are particularly well suited to mode...
We present a displacement based approach over arbitrary polytopes for compressible and nearly incomp...
The scaled boundary finite-element method is extended to simulate time-harmonic responses of non-hom...
A blocked Hamiltonian Schur decomposition is herein proposed for the solution process of the Scaled ...
A novel polygon based numerical technique is formulated using the scaled boundary finite element met...
In order to avoid the numerical difficulties in locally enforcing the incompressibility constraint u...