Strong Local-Nonlocal Coupling for Integrated Fracture Modeling

Littlewood, David John; Silling, Stewart A.; Mitchell, John; Seleson, Pablo; Bond, Stephen D.; Parks, Michael L.; Turner, Daniel Z.; J., Burnett, Damon; Ostien, Jakob T.; Gunzburger, Max

doi:10.2172/1221526

Cited by 17 publications

(5 citation statements)

References 52 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…Deformation and fracture dynamics of the stent made from a 7075-T651 aluminum alloy were performed. A fitting coefficient of 1.9x10 3 and a fitting degree of 2.8 required for computing the remaining life in Equation (2) was obtained by developing an analytical fit to the strain ratio versus cycle dependence reported in [9]. The obtained fit is shown in Figure 2.…”

Section: Resultsmentioning

confidence: 99%

See 1 more Smart Citation

Stent Fracture Predictions With Peridynamics

Vasenkov¹

2018

2018 Design of Medical Devices Conference

View full text Add to dashboard Cite

Currently, stent therapy constitutes to over 95% of all endovascular interventions. The biological and clinical complications of stent therapy can now be well controlled with modern techniques and procedures. However, the mechanical failure of stent remains an important clinical problem [1]. While there is a consensus that such failure usually proceeds through mechanical fracture activation due to fatigue, the mechanisms of fracture activation are not well understood. The virtual analysis of fracture is typically conducted using the Finite Element Method (FEM) model regulated by the externally applied criteria of fracture nucleation. Typically, the FEM model must deal with ambiguity of derivatives of displacement at discontinuities and should contain requirements on mesh size to resolve material damage. In this study, we pursue an alternative approach, called peridynamics, to depict the mechanism of fracture activation. Peridynamic damage model does not require special criteria to guide crack or damage growth and naturally accounts for surface roughness that can highly influence fatigue life of stent.

show abstract

Section: Resultsmentioning

confidence: 99%

“…Displacements rather than displacement derivatives are used in the peridynamic governing equations, which provide ample advantages to peridynamics over the FEM in the case of complex materials with heterogeneities and discontinuities. Specifically, the peridynamic equation of deformation is given by [3] ,…”

Section: Methodsmentioning

confidence: 99%

Stent Fracture Predictions With Peridynamics

Vasenkov¹

2018

2018 Design of Medical Devices Conference

View full text Add to dashboard Cite

show abstract

“…A basic desired property of a LtN coupling method is patch-test consistency, which is established when such a method passes the so-called patch test or consistency test [72,76,84]. The main idea is as follows: if for a certain class of problems the local and nonlocal solutions, u l and u nl , respectively, coincide, then "patching" the two problems by coupling the corresponding models should still return the same problem solution.…”

Section: Ltnmentioning

confidence: 99%

A review of Local-to-Nonlocal coupling methods in nonlocal diffusion and nonlocal mechanics

D’Elia¹,

Li²,

Seleson³

et al. 2019

Preprint

Self Cite

View full text Add to dashboard Cite

Local-to-Nonlocal (LtN) coupling refers to a class of methods aimed at combining nonlocal and local modeling descriptions of a given system into a unified coupled representation. This allows to consolidate the accuracy of nonlocal models with the computational expediency of their local counterparts, while often simultaneously removing additional nonlocal modeling issues such as surface effects. The number and variety of proposed LtN coupling approaches have significantly grown in recent year, yet the field of LtN coupling continues to grow and still has open challenges. This review provides an overview of the state-of-the-art of LtN coupling in the context of nonlocal diffusion and nonlocal mechanics, specifically peridynamics. We present a classification of LtN coupling methods and discuss common features and challenges. The goal of this review is not to provide a preferred way to address LtN coupling but to present a broad perspective of the field, which would serve as guidance for practitioners in the selection of appropriate LtN coupling methods based on the characteristics and needs of the problem under consideration.

show abstract

“…In recent years, there has been great interest in using nonlocal integro-differential equations (IDEs) as a means to describe physical systems, due to their natural ability to describe physical phenomena at small scales and their reduced regularity requirements which lead to greater flexibility [3, 9, 15-17, 20, 21, 25, 26, 29, 31, 34-36, 42, 47, 48, 55, 58, 60, 69, 70]. In particular, nonlocal problems with Neumann-type boundary constraints have received particular attention [1,7,8,18,19,23,27,28,30,32,39,41,52,53,57,61,69] due to their prevalence in describing problems related to: interfaces [2], free boundaries, and multiscale/multiphysics coupling problems [5,6,43,59,68]. Unlike classical PDE models, in the nonlocal IDEs the boundary conditions must be defined on a region with non-zero volume outside the surface [19,28,61], in contrast to more traditional engineering scenarios where boundary conditions are typically imposed on a sharp co-dimension one surface.…”

Section: Introductionmentioning

confidence: 99%

An asymptotically compatible approach for Neumann-type boundary condition on nonlocal problems

You

Trask

et al. 2021

ESAIM: M2AN

View full text Add to dashboard Cite

In this paper we consider 2D nonlocal diffusion models with a finite nonlocal horizon parameter δ characterizing the range of nonlocal interactions, and consider the treatment of Neumann-like boundary conditions that have proven challenging for discretizations of nonlocal models. We propose a new generalization of classical local Neumann conditions by converting the local flux to a correction term in the nonlocal model, which provides an estimate for the nonlocal interactions of each point with points outside the domain. While existing 2D nonlocal flux boundary conditions have been shown to exhibit at most first order convergence to the local counter part as δ → 0, the proposed Neumann-type boundary formulation recovers the local case as O(δ2) in the L∞(Ω) norm, which is optimal considering the O(δ2) convergence of the nonlocal equation to its local limit away from the boundary. We analyze the application of this new boundary treatment to the nonlocal diffusion problem, and present conditions under which the solution of the nonlocal boundary value problem converges to the solution of the corresponding local Neumann problem as the horizon is reduced. To demonstrate the applicability of this nonlocal flux boundary condition to more complicated scenarios, we extend the approach to less regular domains, numerically verifying that we preserve second-order convergence for non-convex domains with corners. Based on the new formulation for nonlocal boundary condition, we develop an asymptotically compatible meshfree discretization, obtaining a solution to the nonlocal diffusion equation with mixed boundary conditions that converges with O(δ2) convergence.

show abstract

Strong Local-Nonlocal Coupling for Integrated Fracture Modeling

Cited by 17 publications

References 52 publications

Stent Fracture Predictions With Peridynamics

Stent Fracture Predictions With Peridynamics

A review of Local-to-Nonlocal coupling methods in nonlocal diffusion and nonlocal mechanics

An asymptotically compatible approach for Neumann-type boundary condition on nonlocal problems

Contact Info

Product

Resources

About