A Hybrid Molecular Dynamics/Atomic-Scale Finite Element Method for Quasi-Static Atomistic Simulations at Finite Temperature

.10.1016/S0921-5093(01)01807-X

2.

Demczyk

,

B. G.

,

Wang

,

Y. M.

,

Cumings

,

J.

,

Hetman

,

M.

,

Han

,

W.

,

Zettl

,

A.

, and

Ritchie

,

R. O.

,

2002

, “

Direct Mechanical Measurement of the Tensile Strength and Elastic Modulus of Multiwalled Carbon Nanotubes

,”

Mat. Sci. Eng. A Struct. Mat. Prop. Microstruct. Process.

,

334

(

1–2

), pp.

173

–

178

.10.1103/PhysRevLett.88.045503

3.

Zheng

,

Q. S.

, and

Jiang

,

Q.

,

2002

, “

Multiwalled Carbon Nanotubes as Gigahertz Oscillators

,”

Phys. Ref. Lett.

,

88

(

4

), p.

045503

4.

Boland

,

J. J.

,

Wu

,

B.

, and

Heidelberg

,

A.

,

2005

, “

Mechanical Properties of Ultrahigh-Strength Gold Nanowires

,”

Nature Mater.

,

4

(

7

), pp.

525

–

529

.10.1038/nmat1403

5.

Huang

,

J. Y.

,

Chen

,

S.

,

Wang

,

Z. Q.

,

Kempa

,

K.

,

Wang

,

Y. M.

,

Jo

,

S. H.

,

Chen

,

G.

,

Dresselhaus

,

M. S.

, and

Ren

,

Z. F.

,

2006

, “

Superplastic Carbon Nanotubes—Conditions Have Been Discovered That Allow Extensive Deformation of Rigid Single-Walled Nanotubes.

,”

Nature

,

439

(

7074

), pp.

281

–

281

6.

Ma

,

W.

,

Liu

,

L.

,

Zhang

,

Z.

,

Yang

,

R.

,

Liu

,

G.

,

Zhang

,

T.

,

An

,

X.

,

Yi

,

X.

,

Ren

,

Y.

,

Niu

,

Z.

,

Li

,

J.

,

Dong

,

H.

,

Zhou

,

W.

,

Ajayan

,

P. M.

, and

Xie

,

S.

,

2009

, “

High-Strength Composite Fibers: Realizing True Potential of Carbon Nanotubes in Polymer Matrix Through Continuous Reticulate Architecture and Molecular Level Couplings

,”

Nano Lett.

,

9

(

8

), pp.

2855

–

2861

7.

Alder

,

B. J.

, and

Wainwright

,

T. E.

,

1957

, “

Phase Transition for a Hard Sphere System

,”

J. Chem. Phys.

,

27

(

5

), pp.

1208

–

1209

.10.1063/1.1743957

8.

Alder

,

B. J.

, and

Wainwright

,

T. E.

,

1959

, “

Studies in Molecular Dynamics. 1. General Method

,”

J. Chem. Phys.

,

31

(

2

), pp.

459

–

466

.10.1063/1.1730376

.10.1103/PhysRevB.62.16950

9.

Branício

,

P. S.

, and

Rino

,

J.-P.

,

2000

, “

Large Deformation and Amorphization of Ni Nanowires Under Uniaxial Strain: A Molecular Dynamics Study

,”

Phys. Rev. B

,

62

(

24

), pp.

16950

–

16955

.10.1103/PhysRevB.67.115407

10.

Wei

,

C. Y.

,

Cho

,

K. J.

, and

Srivastava

,

D.

,

2003

, “

Tensile Strength of Carbon Nanotubes Under Realistic Temperature and Strain Rate

,”

Phys. Rev. B

,

67

(

11

), p.

115407

.10.1103/PhysRevB.72.085414

11.

Koh

,

S. J. A.

,

Lee

,

H. P.

,

Lu

,

C.

, and

Cheng

,

Q. H.

,

2005

, “

Molecular Dynamics Simulation of a Solid Platinum Nanowire Under Uniaxial Tensile Strain: Temperature and Strain-Rate Effects

,”

Phys. Rev. B

,

72

(

8

), p.

085414

.10.1016/j.actamat.2011.05.038

12.

Chen

,

Y. L.

,

Liu

,

B.

,

Huang

,

Y.

, and

Hwang

,

K. C.

,

2011

, “

Fracture Toughness of Carbon Nanotube-Reinforced Metal- and Ceramic-Matrix Composites

,”

J. Nanomater.

,

2011

(

1

), p.

746029

. 10.1155/2011/746029

13.

Jennings

,

A. T.

,

Li

,

J.

, and

Greer

,

J. R.

,

2011

, “

Emergence of Strain-Rate Sensitivity in Cu Nanopillars: Transition From Dislocation Multiplication to Dislocation Nucleation

,”

Acta Materialia

,

59

(

14

), pp.

5627

–

5637

14.

Al-Lafi

,

W.

,

Jin

,

J.

,

Xu

,

S. X.

, and

Song

,

M.

,

2010

, “

Performance of MWCNT/HDPE Nanocomposites at High Strain Rates

,”

Macromol. Mat. Eng.

,

295

(

6

), pp.

519

–

522

.10.1002/mame.200900374

.10.1016/j.compscitech.2010.12.025

15.

Lim

,

A. S.

,

An

,

Q.

,

Chou

,

T. W.

, and

Thostenson

,

E. T.

,

2011

, “

Mechanical and Electrical Response of Carbon Nanotube-Based Fabric Composites to Hopkinson Bar Loading

,”

Compos. Sci. Tech.

,

71

(

5

), pp.

616

–

621

.10.1103/PhysRevB.67.092101

16.

E. W. N.

,

Engquist

,

B.

, and

Huang

,

Z. Y.

,

2003

, “

Heterogeneous Multiscale Method: A General Methodology for Multiscale Modeling

,”

Phys. Rev. B

,

67

(

9

), pp.

92101

.10.1103/PhysRevLett.90.238302

17.

Iannuzzi

,

M.

,

Laio

,

A.

, and

Parrinello

,

M.

,

2003

, “

Efficient Exploration of Reactive Potential Energy Surfaces Using Car-Parrinello Molecular Dynamics

,”

Phys. Rev. Lett.

,

90

(

23

), p.

238302

.10.1103/PhysRevLett.95.060202

18.

Dupuy

,

L. M.

,

Tadmor

,

E. B.

,

Miller

,

R. E.

, and

Phillips

,

R.

,

2005

, “

Finite-Temperature Quasicontinuum: Molecular Dynamics Without All the Atoms

,”

Phys. Rev. Lett.

,

95

(

6

), p.

060202

19.

Zhou

,

M.

,

2005

, “

Thermomechanical Continuum Representation of Atomistic Deformation at Arbitrary Size Scales

,”

Proc. R. Soc. Math. Phys. Eng. Sci.

,

461

(

2063

), pp.

3437

–

3472

.10.1098/rspa.2005.1468

.10.1016/j.jmps.2007.09.005

20.

Kulkarni

,

Y.

,

Knap

,

J.

, and

Ortiz

,

M.

,

2008

, “

A Variational Approach to Coarse Graining of Equilibrium and Non-Equilibrium Atomistic Description at Finite Temperature

,”

J. Mech. Phys. Solid.

,

56

(

4

), pp.

1417

–

1449

21.

Branduardi

,

D.

,

Bussi

,

G.

, and

Parrinello

,

M.

,

2012

, “

Metadynamics With Adaptive Gaussians

,”

J. Chem. Theory Comp.

,

8

(

7

), pp.

2247

–

2254

.10.1021/ct3002464

22.

Parrinello

,

M.

, and

Rahman

,

A.

,

1981

, “

Polymorphic Transitions in Single-Crystals—A New Molecular-Dynamics Method

,”

J. Appl. Phys.

,

52

(

12

), pp.

7182

–

7190

.10.1063/1.328693

.10.1103/PhysRevB.52.12627

23.

Wang

,

J. H.

,

Li

,

J.

,

Yip

,

S.

,

Phillpot

,

S.

, and

Wolf

,

D.

,

1995

, “

Mechanical Instabilities of Homogeneous Crystals

,”

Phys. Rev. B

,

52

(

17

), pp.

12627

–

12635

.10.1103/PhysRevE.57.7192

24.

Falk

,

M. L.

, and

Langer

,

J. S.

,

1998

, “

Dynamics of Viscoplastic Deformation in Amorphous Solids

,”

Phys. Rev. E

,

57

(

6

), pp.

7192

–

7205

.10.1016/j.cma.2003.12.037

25.

Liu

,

B.

,

Huang

,

Y.

,

Jiang

,

H.

,

Qu

,

S.

, and

Hwang

,

K. C.

,

2004

, “

The Atomic-Scale Finite Element Method

,”

Comp. Meth. Appl. Mech. Eng.

,

193

(

17–20

), pp.

1849

–

1864

.10.1103/PhysRevB.72.035435

26.

Liu

,

B.

,

Jiang

,

H.

,

Huang

,

Y.

,

Qu

,

S.

,

Yu

,

M. F.

, and

Hwang

,

K. C.

,

2005

, “

Atomic-Scale Finite Element Method in Multiscale Computation With Applications to Carbon Nanotubes

,”

Phys. Rev. B

,

72

(

3

), p.

035435

.10.1103/PhysRevLett.63.624

27.

Lesar

,

R.

,

Najafabadi

,

R.

, and

Srolovitz

,

D. J.

,

1989

, “

Finite-Temperature Defect Properties From Free-Energy Minimization

,”

Phys. Rev. Lett.

,

63

(

6

), pp.

624

–

627

.10.1103/PhysRevB.52.9229

28.

Najafabadi

,

R.

, and

Srolovitz

,

D. J.

,

1995

, “

Evaluation of the Accuracy of the Free-Energy-Minimization Method

,”

Phys. Rev. B

,

52

(

13

), pp.

9229

–

9233

.10.1016/j.ijsolstr.2007.12.023

29.

Wang

,

H. Y.

,

Hu

,

M.

,

Xia

,

M. F.

,

Ke

,

F. J.

, and

Bai

,

Y. L.

,

2008

, “

Molecular/Cluster Statistical Thermodynamics Methods to Simulate Quasi-Static Deformations at Finite Temperature

,”

Int. J. Solid. Struct.

,

45

(

13

), pp.

3918

–

3933

30.

Jiang

,

H.

,

Huang

,

Y.

, and

Hwang

,

K. C.

,

2005

, “

A Finite-Temperature Continuum Theory Based on Interatomic Potentials

,”

J. Eng. Mat. Tech.

,

127

(

4

), pp.

408

–

416

.10.1115/1.2019865

31.

Iacobellis

,

V.

, and

Behdinan

,

K.

,

2012

, “

Multiscale Coupling Using a Finite Element Framework at Finite Temperature

,”

Int. J. Num. Meth. Eng.

,

92

(

7

), pp.

652

–

670

.10.1002/nme.4355

.10.1515/IJNSNS.2002.3.3-4.717

32.

Guo

,

W.

, and

Chang

T. Z.

,

2002

, “

Freezing Atom Method in Molecular Dynamics Simulation

,”

Int. J. Nonlin. Sci. Num. Sim.

,

3

(

3–4

), pp.

717

–

720

33.

Verlet

,

L.

,

1967

, “

Computer Experiments on Classical Fluids. I. Thermodynamical Properties of Lennard–Jones Molecules

,”

Phys. Rev.

,

159

(

1

), pp.

98

–

103

.10.1103/PhysRev.159.98

34.

Verlet

,

L.

,

1968

, “

Computer Experiments on Classical Fluids. 2. Equilibrium Correlation Functions

,”

Phys. Rev.

,

165

(

1

), pp.

201

–

214

.10.1103/PhysRev.165.201

35.

Hockney

,

R. W.

, and

Eastwood

,

J. W.

,

1981

,

Computer Simulation Using Particles

,

McGraw-Hill, New York

.

36.

Yakobson

,

B. I.

,

Dumitrica

,

T.

, and

Hua

,

M.

,

2006

, “

Symmetry-, Time-, and Temperature-Dependent Strength of Carbon Nanotubes

,”

Proc. Natl. Acad. Sci. USA

,

103

(

16

), pp.

6105

–

6109

.10.1073/pnas.0600945103

.10.1016/S0927-0256(97)00047-5

37.

Wang

,

X.

,

Li

,

Q.

,

Xie

,

J.

,

Jin

,

Z.

,

Wang

,

J.

,

Li

,

Y.

,

Jiang

,

K.

, and

Fan

,

S.

,

2009

, “

Fabrication of Ultralong and Electrically Uniform Single-Walled Carbon Nanotubes on Clean Substrates

,”

Nano Lett.

,

9

(

9

), pp.

3137

–

3141

38.

Yakobson

,

B. I.

,

Campbell

,

M. P.

,

Brabec

,

C. J.

, and

Bernholc

,

J.

,

1997

, “

High Strain Rate Fracture and C-Chain Unraveling in Carbon Nanotubes

,”

Computat. Mater. Sci.

,

8

(

4

), pp.

341

–

348

.10.1103/PhysRevLett.84.5552

39.

Ruoff

,

R. S.

,

Yu

,

M. F.

,

Files

,

B. S.

, and

Arepalli

,

S.

,

2000

, “

Tensile Loading of Ropes of Single Wall Carbon Nanotubes and Their Mechanical Properties

,”

Phys. Rev. Lett.

,

84

(

24

), pp.

5552

–

5555

40.

Jose-Yacaman

,

M.

,

Troiani

,

H. E.

,

Miki-Yoshida

,

M.

,

Camacho-Bragado

,

G. A.

,

Marques

,

M.

A.

L.

,

Rubio

,

A.

, and

Ascencio

,

J. A.

,

2003

, “

Direct Observation of the Mechanical Properties of Single-Walled Carbon Nanotubes and Their Junctions at the Atomic Level

,”

Nano Lett.

,

3

(

6

), pp.

751

–

755

.10.1021/nl0341640

.10.1088/0953-8984/14/4/312

41.

Brenner

,

D. W.

,

Shenderova

,

O. A.

,

Harrison

,

J. A.

,

Stuart

,

S. J.

,

Ni

,

B.

, and

Sinnott

,

S. B.

,

2002

, “

A Second-Generation Reactive Empirical Bond Order (Rebo) Potential Energy Expression for Hydrocarbons

,”

J. Phys. Conden. Matt.

,

14

(

4

), pp.

783

–

802

.10.1080/00268978400101201

42.

Nose

,

S.

,

1984

, “

A Molecular-Dynamics Method for Simulations in the Canonical Ensemble

,”

Molecular Phys.

,

52

(

2

), pp.

255

–

268

.10.1103/PhysRevA.31.1695

43.

Hoover

,

W. G.

,

1985

, “

Canonical Dynamics—Equilibrium Phase-Space Distributions

,”

Phys. Rev. A

,

31

(

3

), pp.

1695

–

1697

44.

Hone

,

J.

,

Lee

,

C.

,

Wei

,

X. D.

, and

Kysar

,

J. W.

,

2008

, “

Measurement of the Elastic Properties and Intrinsic Strength of Monolayer Graphene

,”

Science

,

321

(

5887

), pp.

385

–

388

.10.1126/science.1157996

45.

Xu

,

R.

,

Liu

,

B.

, and

Dong

,

Y.

,

2013

, “

Scalable Hierarchical Parallel Algorithm for the Solution of Super Large-Scale Sparse Linear Equations

,”

ASME J. Appl. Mech.

,

80

(

2

), pp.

020901

–

8

.10.1115/1.4023481

46.

Andersen

,

H. C.

,

1980

, “

Molecular-Dynamics Simulations at Constant Pressure and/or Temperature

,”

J. Chem. Phys.

,

72

(

4

), pp.

2384

–

2393

.10.1063/1.439486

.10.1103/PhysRevLett.93.185501

47.

Jiang

,

H.

,

Yu

,

M. F.

,

Liu

,

B.

, and

Huang

,

Y.

,

2004

, “

Intrinsic Energy Loss Mechanisms in a Cantilevered Carbon Nanotube Beam Oscillator

,”

Phys. Rev. Lett.

,

93

(

18

), p

185501