Viscous approximation of quasistatic evolutions for a coupled elastoplastic-damage model

Crismale, Vito; Lazzaroni, Giuliano

doi:10.1007/s00526-015-0947-6

Cited by 41 publications

(124 citation statements)

References 29 publications

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“…The discussion of the role of the constitutive assumptions on the emerging macroscopic behaviours shows that damage and plastic localisations may interact to produce cohesive-like cracks. This result has been confirmed through rigorous asymptotic analysis in [29,30,32], showing the convergence of a special case of the model presented in [4] to a cohesive sharp crack model. References [28] and [37] recently proposed an alternative interesting phase-field model of cohesive fracture without introducing plastic effects.…”

Section: Introductionsupporting

confidence: 56%

Coupling damage and plasticity for a phase-field regularisation of brittle, cohesive and ductile fracture: One-dimensional examples

Alessi

Marigo

Maurini

et al. 2018

International Journal of Mechanical Sciences

107

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Plasticity and damage are two fundamental phenomena in nonlinear solid mechanics associated to the development of inelastic deformations and the reduction of the material stiffness. Alessi et al. [4] have recently shown, through a variational framework, that coupling a gradient-damage model with plasticity can lead to macroscopic behaviours assimilable to ductile and cohesive fracture. Here, we further expand this approach considering specific constitutive functions frequently used in phase-field models of brittle fracture. A numerical solution technique of the coupled elastodamage-plasticity problem, based on an alternate minimisation algorithm, is proposed and tested against semi-analytical results. Considering a one-dimensional traction test, we illustrate the properties of four different regimes obtained by a suitable tuning of few key constitutive parameters. Namely, depending on the relative yield stresses and softening behaviours of the plasticity and the damage criteria, we obtain macroscopic responses assimilable to (i) brittle fracturè a la Griffith, (ii) cohesive fractures of the Barenblatt or Dugdale type, and (iii) a sort of cohesive fracture including a depinning energy contribution. The comparisons between numerical and analytical results prove the accuracy of the proposed numerical approaches in the considered quasi-static time-discrete setting, but they also emphasise some subtle issues occurring during time-discontinuous evolutions.

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Section: Introductionsupporting

confidence: 56%

Coupling damage and plasticity for a phase-field regularisation of brittle, cohesive and ductile fracture: One-dimensional examples

Alessi

Marigo

Maurini

et al. 2018

International Journal of Mechanical Sciences

107

View full text Add to dashboard Cite

show abstract

“…This is an improvement with respect to the elastoplastic-damage models in [8] and [9]: the strong damage regularizations therein (respectively W 1,γ , γ > n, and H m , m > n 2 ) permitted us to work with a continuous field α (see also e.g. [23], with H m regularization), and therefore to use Reshetnyak's Theorem for the plastic dissipation.…”

Section: Introductionmentioning

confidence: 99%

“…The proof exploits also tools from the theory of capacity. As in [8] and in [9] the plastic dissipation corresponding to an evolution of α and p in a time interval [s, t] is the H-variation of p with respect to α on [s, t], namely…”

Section: Introductionmentioning

confidence: 99%

“…We show an analogous convergence of the quasistatic evolutions for the present model to evolutions for the coupled elastoplastic damage model proposed in [8], which corresponds to the perfect plasticity for heterogeneous materials studied in [33] when the damage is constant in time. However, we have to consider a stronger (gradient) damage regularization for the Gurtin-Anand model with damage, since in [8] (and [9]) the space continuity of α is needed. An important difference with respect to the analysis in [16] relies on the fact that we cannot still characterize the global stability in the limit model by the equilibrium conditions for the Cauchy stress and the plastic constraint (cf.…”

Section: Introductionmentioning

confidence: 99%

“…material's degradation, on the other hand the dislocation density affects the damage growth. The coupling between plasticity and damage is also investigated for instance in [2] and in [8], [9], by models that do not include plastic strain derivatives. The inclusion of such terms in the formulation permits to describe size effects.…”

Section: Introductionmentioning

confidence: 99%

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Globally stable quasistatic evolution for strain gradient plasticity coupled with damage

Crismale

2016

Annali di Matematica

Self Cite

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Abstract. We consider evolutions for a material model which couples scalar damage with strain gradient plasticity, in small strain assumptions. For strain gradient plasticity, we follow the Gurtin-Anand formulation [19]. The aim of the present model is to account for different phenomena: on the one hand the elastic stiffness reduces and the plastic yield surface shrinks due to material's degradation, on the other hand the dislocation density affects the damage growth. The main result of this paper is the existence of a globally stable quasistatic evolution (in the socalled energetic formulation). Furthermore we study the limit model as the strain gradient terms tend to zero. Under stronger regularity assumptions, we show that the evolutions converge to the ones for the coupled elastoplastic-damage model studied in [8].

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Phase‐Field Fracture at Finite Strains Based on Modified Invariants: A Note on its Analysis and Simulations

2018

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Key words Phase-field model for fracture, Ambrosio-Tortorelli, viscous evolution, finite strains, modified invariants MSC (2010) 35K85,74B20,74B20,74R10,74R20We present recent results on the mathematical analysis of phase-field model for anisotropic fracture at finite strains. It is based on a modification of the Ambrosio-Tortorelli model, formulated for polyconvex energy densities in terms of the modified invariants of the right Cauchy-Green strain tensor and augmented by a viscous dissipation for the phase-field variable. A suitable notion of solution is introduced and used for the simulation of a conchoidal fracture in a brittle specimen.

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Viscous approximation of quasistatic evolutions for a coupled elastoplastic-damage model

Cited by 41 publications

References 29 publications

Coupling damage and plasticity for a phase-field regularisation of brittle, cohesive and ductile fracture: One-dimensional examples

Coupling damage and plasticity for a phase-field regularisation of brittle, cohesive and ductile fracture: One-dimensional examples

Globally stable quasistatic evolution for strain gradient plasticity coupled with damage

Phase‐Field Fracture at Finite Strains Based on Modified Invariants: A Note on its Analysis and Simulations

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