A convergence study is presented for a form of gradient elasticity where the enrichment is through the Laplacian of the strain, so that a fourth-order partial differential equation results. Isogeometric finite element analysis is used to accommodate the higher continuity required by the inclusion of strain gradients. A convergence analysis is carried out for the original system of a fourth-order partial differential equation. Both global refinement, using NURBS, and local refinement, using T-splines, have been applied. Theoretical convergence rates are recovered, except for a polynomial order of two, when the convergence rate is suboptimal, a result which also has been found for the (fourth-order) Cahn-Hilliard equation. The convergence ana...
The use of higher-order strain-gradient models in mechanics is studied. First, existing second-gradi...
The dissertation studies the majority of the most relevant and widespread physico-mathematical model...
A discontinuous Galerkin method has been developed for strain gradient-dependent damage. The strengt...
A convergence study is presented for a form of gradient elasticity where the enrichment is through t...
In the present contribution the concept of isogeometric analysis is extended towards the numerical s...
A variational formulation within an H2 Sobolev space setting is formulated for fourth-order plane st...
Gradient-dependent plasticity can be used to achieve mesh-objective results upon loss of well-posedn...
AbstractMixed formulations with C0-continuity basis functions are employed for the solution of some ...
This thesis introduces Isogeometric Analysis as a potentional bridge between the Finite Element Anal...
Classical continuum mechanics theories are largely insufficient in capturing size effects observed i...
This thesis introduces Isogeometric Analysis as a potentional bridge between the Finite Element Anal...
The gradient scheme framework provides a unified analysis setting for many different families of num...
In this contribution, we use isogeometric analysis for numerical solution of the the Poisson problem...
Implicit gradient plasticity models incorporate higher-order spatial gradients via an additional Hel...
This dissertation is devoted to two families of generalized continuum theories: the first and second...
The use of higher-order strain-gradient models in mechanics is studied. First, existing second-gradi...
The dissertation studies the majority of the most relevant and widespread physico-mathematical model...
A discontinuous Galerkin method has been developed for strain gradient-dependent damage. The strengt...
A convergence study is presented for a form of gradient elasticity where the enrichment is through t...
In the present contribution the concept of isogeometric analysis is extended towards the numerical s...
A variational formulation within an H2 Sobolev space setting is formulated for fourth-order plane st...
Gradient-dependent plasticity can be used to achieve mesh-objective results upon loss of well-posedn...
AbstractMixed formulations with C0-continuity basis functions are employed for the solution of some ...
This thesis introduces Isogeometric Analysis as a potentional bridge between the Finite Element Anal...
Classical continuum mechanics theories are largely insufficient in capturing size effects observed i...
This thesis introduces Isogeometric Analysis as a potentional bridge between the Finite Element Anal...
The gradient scheme framework provides a unified analysis setting for many different families of num...
In this contribution, we use isogeometric analysis for numerical solution of the the Poisson problem...
Implicit gradient plasticity models incorporate higher-order spatial gradients via an additional Hel...
This dissertation is devoted to two families of generalized continuum theories: the first and second...
The use of higher-order strain-gradient models in mechanics is studied. First, existing second-gradi...
The dissertation studies the majority of the most relevant and widespread physico-mathematical model...
A discontinuous Galerkin method has been developed for strain gradient-dependent damage. The strengt...