Usually, smeared crack techniques are based on the following features: the fracture is represented by means of a band of finite elements and by a softening constitutive law of damage type. Often, these methods are implemented with nonlocal operators that control the localization effects and reduce the mesh bias. We consider a nonlocal smeared crack energy defined for a finite element space on a structured grid. We characterize the limit energy as the mesh size h tends to zero and we establish a precise link between the discrete and continuum formulations of the fracture energies, showing the correct scaling and the explicit form of the mesh bias
We derive and numerically verify scaling laws for the macroscopic fracture energy of polymers underg...
Abstract. Strain-softening damage due to distributed cracking is modeled by an elastic continuum wit...
The strain softening behavior due to the development of damage is well known to produce unrealistic ...
Usually, smeared crack techniques are based on the following features: the fracture is represented b...
Our analysis focuses on the mechanical energies involved in the propagation of fractures: the elasti...
AaaTRACT: In the usual local finite element analysis, strain softening causes spurious mesh sensitiv...
ABSTRACT: The classical smeared cracking model widely used in finite-element analysis of concrete an...
The fixed smeared crack concept with strain decomposition is reformulated utilizing a self-adaptive ...
ABSTRACT: A two-dimensional finite element formulation for imbricate non-local strain-softening cont...
In the analysis of cracking localization, consideration of stability and bifurcation of equilibrium ...
In this chapter we present a rigorous convergence analysis of finite difference and finite element a...
Presented is a new type of a non-local continuum model which avoids problems of convergence at mesh ...
Progressive fracture in quasi-brittle materials is often treated via strain softening models in cont...
Continuum approaches to fracture regard crack initiation and growth as the ultimate consequences of ...
As it is now generally accepted, finite element analysis of distributed softening damage in quasi-br...
We derive and numerically verify scaling laws for the macroscopic fracture energy of polymers underg...
Abstract. Strain-softening damage due to distributed cracking is modeled by an elastic continuum wit...
The strain softening behavior due to the development of damage is well known to produce unrealistic ...
Usually, smeared crack techniques are based on the following features: the fracture is represented b...
Our analysis focuses on the mechanical energies involved in the propagation of fractures: the elasti...
AaaTRACT: In the usual local finite element analysis, strain softening causes spurious mesh sensitiv...
ABSTRACT: The classical smeared cracking model widely used in finite-element analysis of concrete an...
The fixed smeared crack concept with strain decomposition is reformulated utilizing a self-adaptive ...
ABSTRACT: A two-dimensional finite element formulation for imbricate non-local strain-softening cont...
In the analysis of cracking localization, consideration of stability and bifurcation of equilibrium ...
In this chapter we present a rigorous convergence analysis of finite difference and finite element a...
Presented is a new type of a non-local continuum model which avoids problems of convergence at mesh ...
Progressive fracture in quasi-brittle materials is often treated via strain softening models in cont...
Continuum approaches to fracture regard crack initiation and growth as the ultimate consequences of ...
As it is now generally accepted, finite element analysis of distributed softening damage in quasi-br...
We derive and numerically verify scaling laws for the macroscopic fracture energy of polymers underg...
Abstract. Strain-softening damage due to distributed cracking is modeled by an elastic continuum wit...
The strain softening behavior due to the development of damage is well known to produce unrealistic ...