Abstract
Based on the sliding crack mechanism the inelastic behavior of brittle materials under compression is modeled in a twofold manner: using a boundary element method (BEM) and Rice’s internal variable theory.
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References
Basista, M. and Gross, D. (1997a) The Sliding Crack Model of Brittle Deformation: an Internal Variable Approach, Int. J. Solids Struct, (in press).
Basista, M. and Gross, D. (1997b) Internal Variable Representation of Microcrack Induced Inelasticity in Brittle Materials, Int. J. Damage Mech., 6, 300–316.
Basista, M. and Gross, D. (1997c) The Sliding Crack Model Revisited, in G.Z. Voyiadjis et al. (eds.), Damage Mechanics in Engineering Materials, Elsevier (in press).
Bettin, A. and Gross, D. (1990) Crack Propagation in Materials with Local Inhomogenities under Thermal Load, in K.P. Herrmann and Z.S. Olesiak (eds.) Lecture Notes in Engeneering, Thermal Effects in Fracture of Multiphase Materials, 59, 85–93.
Erdogan, F. (1983) Stress Intensity Factors, J. Appl. Mech. 50, 992–1002.
Erdogan, F. and Sih, G.C. (1963) On the Crack Extension in Plates under Plane Loading and Transverse Shear, J. Basic Engng, 85D, 519–525.
Horii, H. and Nemat-Nasser, S. (1985) Compression-Induced Microcrack Growth in Brittle Solids: Axial Splitting and Shear Failure, J. Geophys. Res., 90, 3105–3125.
Kachanov, M. (1987) Elastic Solids with Many Cracks-a Simple Method of Analysis, Int. J. Solids Struct., 23, 23–43.
Lauterbach, B. and Gross, D. (in press) Crack Growth in Brittle Solids under Compression, Mech. Mater.
Muskhelishvili, N.I. (1953) Some Basic Problems of Mathematical Theory of Elasticity, Noordhoff, Groningen.
Rice, J.R. (1975) Continuum Mechanics and Thermodynamics of Plasticity in Relation to Microscale Deformation Mechanisms, in A.S. Argon (ed.) Constitutive Equations in Plasticity, The MIT Press, Cambridge, pp. 23–79.
Zoback, M.D. and Byerlee, J.D. (1975) The Effect of Cyclic Differential Stress on Dilatancy in Westerley Granite under Uniaxial arid Triaxial Conditions, J. Geophys. Res., 80, 1526–1530.
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© 1999 Kluwer Academic Publishers
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Basista, M., Gross, D., Lauterbach, B. (1999). Micro- and Macromechanical Modeling of Inelastic Brittle Materials under Compression. In: Bruhns, O.T., Stein, E. (eds) IUTAM Symposium on Micro- and Macrostructural Aspects of Thermoplasticity. Solid Mechanics and its Applications, vol 62. Springer, Dordrecht. https://doi.org/10.1007/0-306-46936-7_15
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DOI: https://doi.org/10.1007/0-306-46936-7_15
Publisher Name: Springer, Dordrecht
Print ISBN: 978-0-7923-5265-5
Online ISBN: 978-0-306-46936-7
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