Through enrichment of the elastic potential by the second-order gradient of deformation, gradient elasticity formulations are capable of taking nonlocal effects into account. Moreover, geometry-induced singularities, which may appear when using classical elasticity formulations, disappear due to the higher regularity of the solution. In this contribution, a mixed finite element discretization for finite strain gradient elasticity is investigated, in which instead of the displacements, the first-order gradient of the displacements is the solution variable. Thus, the C1 continuity condition of displacement-based finite elements for gradient elasticity is relaxed to C0. Contrary to existing mixed approaches, the proposed approach incorporates ...
A robust nonconforming mixed finite element method is developed for a strain gradient elasticity (SG...
This article considers a mixed finite element method for linear elasticity. It is based on a modifie...
Since the 1970’s, mixed formulations have arisen as an alternative to the classical one-field formul...
Through enrichment of the elastic potential by the second-order gradient of deformation, gradient el...
Gradient elasticity formulations have the advantage of avoiding geometry‐induced singularities and c...
Theories on intrinsic or material length scales find applications in the modeling of size-dependent ...
In elasticity, microstructure-related deviations may be modeled by strain gradient elasticity. For s...
We present and compare two different methods for numerically solving boundary value problems of grad...
A Þnite element implementation is reported of the Fleck—Hutchinson phenomenological strain gradient ...
Various finite elements based on mixed formulations have been proposed for the solution of boundary ...
In this article, staggered gradient elasticity formulations are studied. Firstly, the standard equat...
Gradient elasticity is a constitutive framework that takes into account the microstructure of an ela...
We present a general finite element discretisation of Mindlin’s Elasticity with Microstructure. A to...
The present study is related to the utilization of the mixed Meshless Local PetrovGalerkin (MLPG) me...
In this paper, a finite-element implementation of linear second-strain gradient elasticity is introd...
A robust nonconforming mixed finite element method is developed for a strain gradient elasticity (SG...
This article considers a mixed finite element method for linear elasticity. It is based on a modifie...
Since the 1970’s, mixed formulations have arisen as an alternative to the classical one-field formul...
Through enrichment of the elastic potential by the second-order gradient of deformation, gradient el...
Gradient elasticity formulations have the advantage of avoiding geometry‐induced singularities and c...
Theories on intrinsic or material length scales find applications in the modeling of size-dependent ...
In elasticity, microstructure-related deviations may be modeled by strain gradient elasticity. For s...
We present and compare two different methods for numerically solving boundary value problems of grad...
A Þnite element implementation is reported of the Fleck—Hutchinson phenomenological strain gradient ...
Various finite elements based on mixed formulations have been proposed for the solution of boundary ...
In this article, staggered gradient elasticity formulations are studied. Firstly, the standard equat...
Gradient elasticity is a constitutive framework that takes into account the microstructure of an ela...
We present a general finite element discretisation of Mindlin’s Elasticity with Microstructure. A to...
The present study is related to the utilization of the mixed Meshless Local PetrovGalerkin (MLPG) me...
In this paper, a finite-element implementation of linear second-strain gradient elasticity is introd...
A robust nonconforming mixed finite element method is developed for a strain gradient elasticity (SG...
This article considers a mixed finite element method for linear elasticity. It is based on a modifie...
Since the 1970’s, mixed formulations have arisen as an alternative to the classical one-field formul...