This paper deals with the -integral analysis for a nano-inclusion in plane elastic materials under uni-axial or bi-axial loadings. Based on previous works (Gurtin and Murdoch, 1975, “A Continuum Theory of Elastic Material Surfaces,” Arch. Ration. Mech. Anal., 57, pp. 291–323; Mogilevskaya, et al., 2008, “Multiple Interacting Circular Nano-Inhomogeneities With Surface/Interface Effects,” J. Mech. Phys. Solids, 56, pp. 2298–2327), the surface effect induced from the surface tension and the surface Lamé constants is taken into account, and an analytical solution is obtained. Four kinds of inclusions including soft inclusion, hard inclusion, void, and rigid inclusions are considered. The variable tendencies of the -integral for each of four nano-inclusions against the loading or against the inclusion radius are plotted and discussed in detail. It is found that in nanoscale the surface parameters for the hard inclusion or rigid inclusion have a little or little influence on the -integral, and the values of the -integral are always negative as they would be in macroscale, whereas the surface parameters for the soft inclusion or void yield significant influence on the -integral and the values of the -integral could be either positive or negative depending on the loading levels and the surface parameters. Of great interest is that there is a neutral loading point for the soft inclusion or void, at which the -integral transforms from a negative value to a positive value, and that the bi-axial loading yields similar variable tendencies of the -integral as those under the uni-axial tension loading. Moreover, the bi-axial tension loading increases the neutral loading point, whereas the bi-axial tension-compression loading decreases it. Particularly, the magnitude of the negative -integral representing the energy absorbing of the soft inclusion or void increases very sharply as the radius of the soft inclusion or void decreases from 5 nm to 1 nm.
1.
Ortiz
, M.
, 1999, “Nanomechanics of Defects in Solids
,” Adv. Appl. Mech.
0065-2156, 36
, pp. 2
–79
.2.
Kuzumaki
, T.
, Miyazawa
, K.
, Ichinose
, H.
, and Ito
, K.
, 1998, “Processing of Carbon Nanotube Reinforced Aluminum Composite
,” J. Mater. Res.
0884-2914, 13
, pp. 2445
–2449
.3.
Cui
, Y.
, and Lieber
, C. M.
, 2001, “Functional Nanoscale Electronic Devices Assembled Using Silicon Nanowire Building Blocks
,” Science
0036-8075, 291
, pp. 851
–853
.4.
Miller
, R. E.
, and Shenoy
, V. B.
, 2000, “Size-Dependent Elastic Properties of Nanosized Structural Elements
,” Nanotechnology
0957-4484, 11
, pp. 139
–147
.5.
Shenoy
, V. B.
, 2002, “Size-Dependent Rigidities of Nanosized Torsional Elements
,” Int. J. Solids Struct.
0020-7683, 39
, pp. 4039
–4052
.6.
Gibbs
, J. W.
, 1906, Scientific Papers
, Vol. 1
, Longmans-Green
, London
.7.
Nix
, W. D.
, and Gao
, H.
, 1998, “An Atomistic Interpretation of Interface Stress
,” Scr. Mater.
1359-6462, 39
, pp. 1653
–1661
.8.
Gurtin
, M. E.
, and Murdoch
, A. I.
, 1975, “A Continuum Theory of Elastic Material Surfaces
,” Arch. Ration. Mech. Anal.
0003-9527, 57
, pp. 291
–323
.9.
Gurtin
, M. E.
, Weissmuller
, J.
, and Larché
, F.
, 1988, “A General Theory of Curved Deformable Interfaces in Solids at Equilibrium
,” Philos. Mag. A
0141-8610, 78
, pp. 1093
–1109
.10.
Sharma
, P.
, and Ganti
, S.
, 2002, “Interfacial Elasticity Corrections to Size-Dependent Strain-State of Embedded Quantum Dots
,” Phys. Status Solidi B
0370-1972, 234
, pp. R10
–R12
.11.
Sharma
, P.
, and Ganti
, S.
, 2004, “Size-Dependent Eshelby’s Tensor for Embedded Nano-Inclusions Incorporating Surface/Interface Energies
,” ASME J. Appl. Mech.
0021-8936, 71
, pp. 663
–671
.12.
Sharma
, P.
, and Wheeler
, L. T.
, 2007, “Size-Dependent Elastic State of Ellipsoidal Nano-Inclusions Incorporating Surface/Interface Tension
,” ASME J. Appl. Mech.
0021-8936, 74
, pp. 447
–455
.13.
Sharma
, P.
, Ganti
, S.
, and Bhate
, N.
, 2003, “Effect of Surfaces on the Size-Dependent Elastic State of Nano-Inhomogeneities
,” Appl. Phys. Lett.
0003-6951, 82
, pp. 535
–537
.14.
Duan
, H. L.
, Wang
, J.
, Huang
, Z. P.
, and Luo
, Z. Y.
, 2005, “Stress Concentration Tensors of Inhomogeneities With Interface Effects
,” Mech. Mater.
0167-6636, 37
, pp. 723
–736
.15.
Duan
, H. L.
, Wang
, J.
, Huang
, Z. P.
, and Karihaloo
, B. L.
, 2005, “Eshelby Formalism for Nano-Inhomogeneities
,” Proc. R. Soc. London, Ser. A
0950-1207, 461
, pp. 3335
–3353
.16.
Lim
, C. W.
, Li
, Z. R.
, and He
, L. H.
, 2006, “Size-Dependent, Non-Uniform Elastic Field Inside a Nano-Scale Spherical Inclusion Due to Interface Stress
,” Int. J. Solids Struct.
0020-7683, 43
, pp. 5055
–5065
.17.
Tian
, L.
, and Rajapakse
, R. K. N. D.
, 2007, “Analytical Solution for Size-Dependent Elastic Field of a Nanoscale Circular Inhomogeneity
,” ASME J. Appl. Mech.
0021-8936, 74
, pp. 568
–574
.18.
Mogilevskaya
, S. G.
, Crouch
, S. L.
, and Stolarski
, H. K.
, 2008, “Multiple Interacting Circular Nano-Inhomogeneities With Surface/Interface Effects
,” J. Mech. Phys. Solids
0022-5096, 56
, pp. 2298
–2327
.19.
Wang
, G. F.
, and Wang
, T. J.
, 2006, “Surface Effects on the Diffraction of Plane Compressional Waves by a Nanosized Circular Hole
,” Appl. Phys. Lett.
0003-6951, 89
, p. 231923
.20.
Yang
, F. Q.
, 2004, “Size-Dependent Effective Modulus of Elastic Composite Materials: Spherical Nanocavities at Dilute Concentrations
,” J. Appl. Phys.
0021-8979, 95
, pp. 3516
–3520
.21.
Duan
, H. L.
, Wang
, J.
, Huang
, Z. P.
, and Karihaloo
, B. L.
, 2005, “Size-Dependent Effective Elastic Constants of Solids Containing Nano-inhomogeneities With Interface Stress
,” J. Mech. Phys. Solids
0022-5096, 53
, pp. 1574
–1596
.22.
Marian
, J.
, Knap
, J.
, and Ortiz
, M.
, 2005, “Nanovoid Deformation in Aluminum Under Simple Shear
,” Acta Mater.
1359-6454, 53
, pp. 2893
–2900
.23.
Borodich
, F. M.
, and Keer
, L. M.
, 2004, “Evaluation of Elastic Modulus of Materials by Adhesive (No-Slip) Nano-Indentation
,” Proc. R. Soc. London, Ser. A
0950-1207, 460
, pp. 507
–514
.24.
Hu
, N.
, Fukunaga
, H.
, Lu
, C.
, Kameyama
, M.
, and Yan
, B.
, 2003, “Prediction of Elastic Properties of Carbon Nanotube Reinforced Composites
,” Proc. R. Soc. London, Ser. A
0950-1207, 461
, pp. 1685
–1710
.25.
Lloyd
, S. J.
, Castellero
, A.
, Giuliani
, F.
, Long
, Y.
, McLaughlin
, K. K.
, Molina-Aldareguia
, J. M.
, Stelmashenko
, N. A.
, Vandeperre
, L. J.
, and Clegg
, W. J.
, 2003, “Observations of Nanoindents Via Cross-Sectional Transmission Electron Microscopy: A Survey of Deformation Mechanisms
,” Proc. R. Soc. London, Ser. A
0950-1207, 461
, pp. 2521
–2543
.26.
Jayaweera
, N. B.
, Downes
, J. R.
, Frogley
, M. D.
, Hopkinson
, M.
, Bushby
, A. J.
, Kidd
, P.
, Kelly
, A.
, and Dunstan
, D. J.
, 2003, “The Onset of Plasticity in Nanoscale Contact Loading
,” Proc. R. Soc. London, Ser. A
0950-1207, 459
, pp. 2049
–2068
.27.
Garg
, A.
, Han
, J.
, and Sinnott
, S. B.
, 1998, “Interactions of Carbon-Nanotube Proximal Probe Tips With Diamond and Graphene
,” Phys. Rev. Lett.
0031-9007, 81
, pp. 2260
–3
.28.
Poncharal
, P.
, Wang
, Z.
, Ugarte
, D.
, and deHeer
, W. A.
, 1999, “Electrostatic Deflections and Electromechanical Resonances of Carbon Nanotubes
,” Science
0036-8075, 283
, pp. 1513
–1516
.29.
Terrones
, M.
, Grobert
, N.
, Hsu
, W.
, Zhu
, Y.
, Hu
, W.
, Terrones
, H.
, Hare
, J.
, Kroto
, H.
, and Walton
, D.
, 1999, “Advances in the Creation of Filled Nanotubes and Novel Nanowires
,” MRS Bull.
0883-7694, 24
, pp. 43
–49
.30.
Wong
, E.
, Sheehan
, P. E.
, and Lieber
, C. M.
, 1997, “Nanobeam Mechanics: Elasticity, Strength, and Toughness of Nanorods and Nanotubes
,” Science
0036-8075, 277
, pp. 1971
–1975
.31.
Yakobson
, B. I.
, 1998, “Mechanical Relaxation and ‘Intramolecular Plasticity’ in Carbon Nanotubes
,” Appl. Phys. Lett.
0003-6951, 72
, pp. 918
–920
.32.
Yakobson
, B. I.
, Brabec
, C. J.
, and Bernhole
, J.
, 1996, “Nanomechanics of Carbon Tubes: Instabilities Beyond Linear Response
,” Phys. Rev. Lett.
0031-9007, 76
, pp. 2511
–2514
.33.
Sharma
, P.
, and Ganti
, S.
, 2005, “Erratum: “Size-Dependent Eshelby’s Tensor for Embedded Nano-Inclusions Incorporating Surface/Interface Energies” [Journal of Applied Mechanics, 2004, 71(5), pp. 663–671]
,” ASME J. Appl. Mech.
0021-8936, 72
, p. 628
.34.
Dingreville
, R.
, Qu
, J.
, and Cherkauoi
, M.
, 2005, “Surface Free Energy and Its Effect on the Elastic Behavior of Nano-Sized Particles, Wires and Films
,” J. Mech. Phys. Solids
0022-5096, 53
, pp. 1827
–1854
.35.
Park
, H. S.
, and Klein
, P. A.
, 2008, “Surface Stress Effects on the Resonant Properties of Metal Nanowires: The Importance of Finite Deformation Kinematics and the Impact of the Residual Surface Stress
,” J. Mech. Phys. Solids
0022-5096, 56
, pp. 3144
–3166
.36.
Knowles
, J. K.
, and Sternberg
, E.
, 1972, “On a Class of Conservation Laws in Linearized and Finite Elastostatics
,” Arch. Ration. Mech. Anal.
0003-9527, 44
, pp. 187
–211
.37.
Budiansky
, B.
, and Rice
, J. R.
, 1973, “Conservation Laws and Energy-Release Rates
,” ASME J. Appl. Mech.
0021-8936, 40
, pp. 201
–203
.38.
Eshelby
, J. D.
, 1974, “Calculation of Energy Release Rate
,” Prospects of Fracture Mechanics
, G. C.
Sih
and D.
Broek
, eds., Noordhoff International
, Groningen, The Netherlands
, pp. 69
–84
.39.
Freund
, L. B.
, 1978, “Stress-Intensity Factor Calculations Based on a Conservation Integral
,” Int. J. Solids Struct.
0020-7683, 14
, pp. 241
–250
.40.
Herrmann
, A. G.
, and Herrmann
, G.
, 1981, “On Energy Release Rates for a Plane Crack
,” ASME J. Appl. Mech.
0021-8936, 48
, pp. 525
–528
.41.
Eischen
, J. W.
, and Herrmann
, G.
, 1987, “Energy Release Rates and Related Balance Laws in Linear Elastic Defect Mechanics
,” ASME J. Appl. Mech.
0021-8936, 54
, pp. 388
–392
.42.
Choi
, N. Y.
, and Earmme
, Y. Y.
, 1992, “Evaluation of Stress Intensity Factors in Circular Arc-Shaped Interfacial Crack Using L Integral
,” Mech. Mater.
0167-6636, 14
, pp. 141
–153
.43.
Seed
, G. M.
, 1997, “The Boussinesq Wedge and the Jk, L, and M Integrals
,” Fatigue Fract. Eng. Mater. Struct.
8756-758X, 20
, pp. 907
–916
.44.
Chen
, Y. H.
, 2001, “M-Integral for Two Dimension Solids With Strongly Interacting Cracks. Part I: In an Infinite Brittle Solids
,” Int. J. Solids Struct.
0020-7683, 38
, pp. 3193
–3212
.45.
Chen
, Y. H.
, 2001, “M-Integral for Two-Dimensional Solids With Strongly Interacting Cracks. Part II: In the Brittle Phase of an Infinite Metal/Ceramic Biomaterial
,” Int. J. Solids Struct.
0020-7683, 38
, pp. 3213
–3232
.46.
Li
, Q.
, and Chen
, Y. H.
, 2008, “Surface Effect and Size Dependent on the Energy Release Due to a Nanosized Hole Expansion in Plane Elastic Materials
,” ASME J. Appl. Mech.
0021-8936, 75
, p. 061008
.Copyright © 2010
by American Society of Mechanical Engineers
You do not currently have access to this content.
