Estimation of J-integral for a Non-local Particle Model Using Atomistic Finite Element Method and Coupling Between Non-local Particle and Finite Element Methods

abstract: In this paper, at first, analytical formulation of J-integral for a non-local particle model (VCPM) using atomic scale finite element method is proposed for fracture analysis of 2D solids. A brief review of classical continuum-based J-integral and anon-local lattice particle method is give...

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Other Authors: Zope, Jayesh Vishnu (Author)
Format: Dissertation
Language:English
Published: 2016
Subjects:
Online Access:http://hdl.handle.net/2286/R.I.40273
id ndltd-asu.edu-item-40273
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spelling ndltd-asu.edu-item-402732018-06-22T03:07:45Z Estimation of J-integral for a Non-local Particle Model Using Atomistic Finite Element Method and Coupling Between Non-local Particle and Finite Element Methods abstract: In this paper, at first, analytical formulation of J-integral for a non-local particle model (VCPM) using atomic scale finite element method is proposed for fracture analysis of 2D solids. A brief review of classical continuum-based J-integral and anon-local lattice particle method is given first. Following this, detailed derivation for the J-integral in discrete particle system is given using the energy equivalence and stress-tensor mapping between the continuum mechanics and lattice-particle system.With the help of atomistic finite element method, the J-integral is expressed as a summation of the corresponding terms in the particle system. Secondly, a coupling algorithm between a non-local particle method (VCPM) and the classical finite element method (FEM) is discussed to gain the advantages of both methods for fracture analysis in large structures. In this algorithm, the discrete VCPM particle and the continuum FEM domains are solved within a unified theoretical framework. A transitional element technology is developed to smoothly link the 10-particles element with the traditional FEM elements to guaranty the continuity and consistency at the coupling interface. An explicit algorithm for static simulation is developed. Finally, numerical examples are illustrated for the accuracy, convergence, and path-independence of the derived J-integral formulation. Discussions on the comparison with alternative estimation methods and potential application for fracture simulation are given. The accuracy and efficiency of the coupling algorithm are tested by several benchmark problems such as static crack simulation. Dissertation/Thesis Zope, Jayesh Vishnu (Author) Liu, Yongming (Advisor) Oswald, Jay (Committee member) Jiang, Hanqing (Committee member) Arizona State University (Publisher) Mechanical engineering coupling finite element method fracture J-integral particle method eng 46 pages Masters Thesis Mechanical Engineering 2016 Masters Thesis http://hdl.handle.net/2286/R.I.40273 http://rightsstatements.org/vocab/InC/1.0/ All Rights Reserved 2016
collection NDLTD
language English
format Dissertation
sources NDLTD
topic Mechanical engineering
coupling
finite element method
fracture
J-integral
particle method
spellingShingle Mechanical engineering
coupling
finite element method
fracture
J-integral
particle method
Estimation of J-integral for a Non-local Particle Model Using Atomistic Finite Element Method and Coupling Between Non-local Particle and Finite Element Methods
description abstract: In this paper, at first, analytical formulation of J-integral for a non-local particle model (VCPM) using atomic scale finite element method is proposed for fracture analysis of 2D solids. A brief review of classical continuum-based J-integral and anon-local lattice particle method is given first. Following this, detailed derivation for the J-integral in discrete particle system is given using the energy equivalence and stress-tensor mapping between the continuum mechanics and lattice-particle system.With the help of atomistic finite element method, the J-integral is expressed as a summation of the corresponding terms in the particle system. Secondly, a coupling algorithm between a non-local particle method (VCPM) and the classical finite element method (FEM) is discussed to gain the advantages of both methods for fracture analysis in large structures. In this algorithm, the discrete VCPM particle and the continuum FEM domains are solved within a unified theoretical framework. A transitional element technology is developed to smoothly link the 10-particles element with the traditional FEM elements to guaranty the continuity and consistency at the coupling interface. An explicit algorithm for static simulation is developed. Finally, numerical examples are illustrated for the accuracy, convergence, and path-independence of the derived J-integral formulation. Discussions on the comparison with alternative estimation methods and potential application for fracture simulation are given. The accuracy and efficiency of the coupling algorithm are tested by several benchmark problems such as static crack simulation. === Dissertation/Thesis === Masters Thesis Mechanical Engineering 2016
author2 Zope, Jayesh Vishnu (Author)
author_facet Zope, Jayesh Vishnu (Author)
title Estimation of J-integral for a Non-local Particle Model Using Atomistic Finite Element Method and Coupling Between Non-local Particle and Finite Element Methods
title_short Estimation of J-integral for a Non-local Particle Model Using Atomistic Finite Element Method and Coupling Between Non-local Particle and Finite Element Methods
title_full Estimation of J-integral for a Non-local Particle Model Using Atomistic Finite Element Method and Coupling Between Non-local Particle and Finite Element Methods
title_fullStr Estimation of J-integral for a Non-local Particle Model Using Atomistic Finite Element Method and Coupling Between Non-local Particle and Finite Element Methods
title_full_unstemmed Estimation of J-integral for a Non-local Particle Model Using Atomistic Finite Element Method and Coupling Between Non-local Particle and Finite Element Methods
title_sort estimation of j-integral for a non-local particle model using atomistic finite element method and coupling between non-local particle and finite element methods
publishDate 2016
url http://hdl.handle.net/2286/R.I.40273
_version_ 1718701239709990912