On the modeling of highly localized deformations induced by material failure: The strong discontinuity approach

SummaryNumerical analyses of large engineering structures undergoing highly localized deformations induced by material failure such as cracking in concrete or shear bands in soils still represent a challenge to the scientific community. In this paper, an efficient concept suitable for the analysis of those problems is presented. More precisely, an overview of the Strong Discontinuity Approach (SDA) is given. This specific approach is characterized by the incorporation of strong discontinuities, i.e. discontinuous displacement fields, into standard displacement-based finite elements by means of the Enhanced Assumed Strain (EAS) concept. The fundamentals of the SDA are illustrated and compared to those of other models based on discontinuous deformation mappings. The main part of this contribution deals with the numerical implementation of the SDA. Besides the original finite element formulation of the SDA, two more recently proposed algorithmic frameworks which avoid the use of the static condensation technique are presented. Both models result in a set of equations formally identical to that known from classical plasticity theory and, consequently, it can be solved by applying the return-mapping algorithm. Several recently suggested extensions of the SDA such as rotating surfaces of discontinuous displacements and intersecting discontinuities are discussed and investigated by means of finite element analyses. The applicability of the SDA as well as its numerical performance is illustrated by means of fully three-dimensional ultimate load analyses.

[1]  J. C. Simo,et al.  An analysis of strong discontinuities induced by strain-softening in rate-independent inelastic solids , 1993 .

[2]  J. Blaauwendraad,et al.  Crack Models for Concrete, Discrete or Smeared? Fixed, Multi-Directional or Rotating? , 1989 .

[3]  I. Stakgold Green's Functions and Boundary Value Problems , 1979 .

[4]  Wai-Fah Chen,et al.  Plasticity for Structural Engineers , 1988 .

[5]  N. S. Ottosen,et al.  Properties of discontinuous bifurcation solutions in elasto-plasticity , 1991 .

[6]  Günther Meschke,et al.  3D FE ANALYSIS OF CRACKS BY MEANS OF THE STRONG DISCONTINUITY APPROACH , 2000 .

[7]  A. Cemal Eringen,et al.  A unified theory of thermomechanical materials , 1966 .

[8]  J. C. Simo,et al.  A CLASS OF MIXED ASSUMED STRAIN METHODS AND THE METHOD OF INCOMPATIBLE MODES , 1990 .

[9]  Ronaldo I. Borja,et al.  A finite element model for strain localization analysis of strongly discontinuous fields based on standard Galerkin approximation , 2000 .

[10]  J. Mosler,et al.  Fe-modeling of displacement discontinuities in inelastic continua , 2001 .

[11]  Michael Ortiz,et al.  An analytical study of the localized failure modes of concrete , 1987 .

[12]  Esteban Samaniego,et al.  On the strong discontinuity approach in finite deformation settings , 2003 .

[13]  Otto T. Bruhns,et al.  Bounds to bifurcation stresses in solids with non-associated plastic flow law at finite strain , 1981 .

[14]  M. Klisinski,et al.  FINITE ELEMENT WITH INNER SOFTENING BAND , 1991 .

[15]  G. Sih Strain-energy-density factor applied to mixed mode crack problems , 1974 .

[16]  G. N. Pande,et al.  A new joint element for the analysis of media having discrete discontinuities , 1999 .

[17]  G. R. Walsh,et al.  Methods Of Optimization , 1976 .

[18]  Walter Noll,et al.  The thermodynamics of elastic materials with heat conduction and viscosity , 1963 .

[19]  R. de Borst,et al.  Non-linear analysis of frictional materials , 1986 .

[20]  René de Borst,et al.  Gradient-dependent plasticity: formulation and algorithmic aspects , 1992 .

[21]  Kenneth Runesson,et al.  Discontinuous Displacement Approximation for Capturing Plastic Localization , 1993 .

[22]  Gianni Dal Maso,et al.  Fine Properties of Functions with Bounded Deformation , 1997 .

[23]  J. Mandel Conditions de Stabilité et Postulat de Drucker , 1966 .

[24]  J. Oliver,et al.  Strong discontinuities and continuum plasticity models: the strong discontinuity approach , 1999 .

[25]  J. Mandel Generalisation de la theorie de plasticite de W. T. Koiter , 1965 .

[26]  L. J. Sluys,et al.  Three-dimensional embedded discontinuity model for brittle fracture , 2001 .

[27]  J. Oliyer Continuum modelling of strong discontinuities in solid mechanics using damage models , 1995 .

[28]  Ted Belytschko,et al.  Wave propagation in a strain-softening bar: Exact solution , 1985 .

[29]  E. Kröner,et al.  Elasticity theory of materials with long range cohesive forces , 1967 .

[30]  Ronaldo I. Borja,et al.  Bifurcation of elastoplastic solids to shear band mode at finite strain , 2001 .

[31]  Francisco Armero,et al.  Finite element methods for the analysis of strong discontinuities in coupled poro-plastic media , 2002 .

[32]  Roman Lackner,et al.  An anisotropic elastoplastic‐damage model for plain concrete , 1998 .

[33]  J. Oliver A consistent characteristic length for smeared cracking models , 1989 .

[34]  P. Benson Shing,et al.  Embedded representation of fracture in concrete with mixed finite elements , 1995 .

[35]  Zenon Mróz,et al.  Finite element analysis of deformation of strain‐softening materials , 1981 .

[36]  F. Armero,et al.  Large‐scale modeling of localized dissipative mechanisms in a local continuum: applications to the numerical simulation of strain localization in rate‐dependent inelastic solids , 1999 .

[37]  J. C. Simo,et al.  Geometrically non‐linear enhanced strain mixed methods and the method of incompatible modes , 1992 .

[38]  M. Ortiz,et al.  A finite element method for localized failure analysis , 1987 .

[39]  J. Marsden,et al.  Variational Multisymplectic Formulations of Nonsmooth Continuum Mechanics , 2003 .

[40]  T. Belytschko,et al.  Extended finite element method for three-dimensional crack modelling , 2000 .

[41]  R. Borst,et al.  Experimental monitoring of strain localization and failure behaviour of composite materials , 1996 .

[42]  Thomas Olofsson,et al.  Stress locking in the inner softening band method : a study of the origin and how to reduce the effects , 1998 .

[43]  Christian Miehe,et al.  Post-critical discontinuous localization analysis of small-strain softening elastoplastic solids , 1994, Archive of Applied Mechanics.

[44]  Ted Belytschko,et al.  Elastic crack growth in finite elements with minimal remeshing , 1999 .

[45]  Thomas Olofsson,et al.  Inner softening bands : a new approach to localization in finite elements , 1994 .

[46]  E. Stein,et al.  Instability phenomena in plasticity: Modelling and computation , 1995 .

[47]  Michael Ortiz,et al.  Nonconvex energy minimization and dislocation structures in ductile single crystals , 1999 .

[48]  J. Mosler,et al.  AN EFFICIENT NUMERICAL IMPLEMENTATION FOR LOCALLY EMBEDDED STRONG DISCONTINUITIES , 2004 .

[49]  G. Maier,et al.  NONASSOCIATED AND COUPLED FLOW RULES OF ELASTOPLASTICITY FOR ROCK-LIKE MATERIALS , 1979 .

[50]  R. Hill A general theory of uniqueness and stability in elastic-plastic solids , 1958 .

[51]  Egidio Rizzi,et al.  Localization analysis of elastic degradation with application to scalar damage , 1995 .

[52]  Roger Temam,et al.  Functions of bounded deformation , 1980 .

[53]  Eugenio Oñate,et al.  A constitutive model for cracking of concrete based on the incremental theory of plasticity , 1988 .

[54]  J. Rice,et al.  CONDITIONS FOR THE LOCALIZATION OF DEFORMATION IN PRESSURE-SENSITIVE DILATANT MATERIALS , 1975 .

[55]  Sanjay Govindjee,et al.  Anisotropic modelling and numerical simulation of brittle damage in concrete , 1995 .

[56]  Z. Bažant,et al.  Nonlocal damage theory , 1987 .

[57]  Richard A. Regueiro,et al.  Strain localization in frictional materials exhibiting displacement jumps , 2001 .

[58]  P-M. Suquet Existence and Regularity of Solutions for Plasticity Problems , 1980 .

[59]  Milan Jirásek,et al.  Embedded crack model: I. Basic formulation , 2001 .

[60]  Jörn Mosler,et al.  On advanced solution strategies to overcome locking effects in strong discontinuity approaches , 2005 .

[61]  Ronaldo I. Borja,et al.  Finite element simulation of strain localization with large deformation: capturing strong discontinuity using a Petrov–Galerkin multiscale formulation , 2002 .

[62]  A. Cemal Eringen,et al.  On nonlocal plasticity , 1981 .

[63]  F. Armero,et al.  An analysis of strong discontinuities in multiplicative finite strain plasticity and their relation with the numerical simulation of strain localization in solids , 1996 .

[64]  Z. Bažant,et al.  Crack band theory for fracture of concrete , 1983 .

[65]  P. Perzyna Fundamental Problems in Viscoplasticity , 1966 .

[66]  L. J. Sluys,et al.  A new method for modelling cohesive cracks using finite elements , 2001 .

[67]  Jörn Mosler,et al.  3D modelling of strong discontinuities in elastoplastic solids: fixed and rotating localization formulations , 2003 .

[68]  L. J. Sluys,et al.  Analysis of slip planes in three-dimensional solids , 2001 .

[69]  T. Belytschko,et al.  A finite element with embedded localization zones , 1988 .

[70]  J. Rice Localization of plastic deformation , 1976 .

[71]  Kenneth Runesson,et al.  Discontinuous bifurcations of elastic-plastic solutions at plane stress and plane strain , 1991 .

[72]  Jonas Larsson,et al.  Localization Analysis of a Fluid Saturated Elastoplastic Porous Medium Using Regularized Discontinuities , 2000 .

[73]  Thomas J. R. Hughes,et al.  A study of strain localization in a multiple scale framework—The one-dimensional problem , 1998 .

[74]  Ulf Ohlsson,et al.  Mixed-mode fracture and anchor bolts in concrete analysis with inner softening bands , 1997 .

[75]  David G. Luenberger,et al.  Linear and nonlinear programming , 1984 .

[76]  G. I. Barenblatt THE MATHEMATICAL THEORY OF EQUILIBRIUM CRACKS IN BRITTLE FRACTURE , 1962 .

[77]  F. Erdogan,et al.  On the Crack Extension in Plates Under Plane Loading and Transverse Shear , 1963 .

[78]  Ted Belytschko,et al.  An extended finite element method for modeling crack growth with frictional contact , 2001 .

[79]  R. Borst SIMULATION OF STRAIN LOCALIZATION: A REAPPRAISAL OF THE COSSERAT CONTINUUM , 1991 .

[80]  Milan Jirásek,et al.  Embedded crack model. Part II: combination with smeared cracks , 2001 .

[81]  Hans Muhlhaus,et al.  A variational principle for gradient plasticity , 1991 .

[82]  A. Eringen Theories of nonlocal plasticity , 1983 .

[83]  T. Belytschko,et al.  Non‐planar 3D crack growth by the extended finite element and level sets—Part II: Level set update , 2002 .

[84]  Jörn Mosler,et al.  A 3D anisotropic elastoplastic‐damage model using discontinuous displacement fields , 2004 .

[85]  R. Fletcher Practical Methods of Optimization , 1988 .

[86]  Carsten Carstensen,et al.  Non–convex potentials and microstructures in finite–strain plasticity , 2002, Proceedings of the Royal Society of London. Series A: Mathematical, Physical and Engineering Sciences.

[87]  M. F. Snyman,et al.  A SIMPLE FORMULATION OF A DILATANT JOINT ELEMENT GOVERNED BY COULOMB FRICTION , 1991 .

[88]  K. Willam,et al.  Localization within the Framework of Micropolar Elasto-Plasticity , 1991 .

[89]  J. Oliver On the discrete constitutive models induced by strong discontinuity kinematics and continuum constitutive equations , 2000 .

[90]  René de Borst,et al.  Some recent issues in computational failure mechanics , 2001 .

[91]  J. Oliver MODELLING STRONG DISCONTINUITIES IN SOLID MECHANICS VIA STRAIN SOFTENING CONSTITUTIVE EQUATIONS. PART 1: FUNDAMENTALS , 1996 .

[92]  Francisco Armero,et al.  An analysis of strong discontinuities in a saturated poro-plastic solid , 1999 .

[93]  W. T. Koiter Stress-strain relations, uniqueness and variational theorems for elastic-plastic materials with a singular yield surface , 1953 .

[94]  Ted Belytschko,et al.  Modelling crack growth by level sets in the extended finite element method , 2001 .

[95]  L. J. Sluys,et al.  Incorrect initiation and propagation of failure in non-local and gradient-enhanced media , 2004 .

[96]  C. R. Johnson,et al.  A Finite Element Method for Problems in Perfect Plasticity Using Discontinuous Trial Functions , 1981 .

[97]  J. Lubliner On the thermodynamic foundations of non-linear solid mechanics , 1972 .

[98]  O. Ladyzhenskaya The Boundary Value Problems of Mathematical Physics , 1985 .

[99]  Jörn Mosler,et al.  A novel algorithmic framework for the numerical implementation of locally embedded strong discontinuities , 2005 .

[100]  K. Runesson,et al.  Embedded localization band in undrained soil based on regularized strong discontinuity theory and FE-analysis , 1996 .

[101]  Jörn Mosler,et al.  On the efficient implementation of an elastoplastic damage model for large-scale analyses of material failure: a multiscale approach , 2005 .

[102]  R. Nuismer An energy release rate criterion for mixed mode fracture , 1975 .

[103]  A. Hillerborg,et al.  Analysis of crack formation and crack growth in concrete by means of fracture mechanics and finite elements , 1976 .

[104]  Paul Steinmann,et al.  Finite element embedded localization band for finite strain plasticity based on a regularized strong discontinuity , 1999 .

[105]  D. S. Dugdale Yielding of steel sheets containing slits , 1960 .

[106]  Milan Jirásek,et al.  Inelastic Analysis of Structures , 2001 .

[107]  E. Dvorkin,et al.  Finite elements with displacement interpolated embedded localization lines insensitive to mesh size and distortions , 1990 .

[108]  K. Bathe Finite Element Procedures , 1995 .

[109]  Paul Steinmann,et al.  On the localization properties of multiplicative hyperelasto-plastic continua with strong discontinuities , 1997 .

[110]  Christian Miehe,et al.  Analysis of microstructure development in shearbands by energy relaxation of incremental stress potentials: Large‐strain theory for standard dissipative solids , 2003 .

[111]  T. Belytschko,et al.  Non‐planar 3D crack growth by the extended finite element and level sets—Part I: Mechanical model , 2002 .

[112]  J. Lemaître A CONTINUOUS DAMAGE MECHANICS MODEL FOR DUCTILE FRACTURE , 1985 .

[113]  Richard A. Regueiro,et al.  A finite element model of localized deformation in frictional materials taking a strong discontinuity approach , 1999 .

[114]  Francisco Armero,et al.  On the characterization of localized solutions in inelastic solids: an analysis of wave propagation in a softening bar , 2001 .

[115]  P. Steinmann,et al.  A finite element formulation for strong discontinuities in fluid‐saturated porous media , 1999 .

[116]  Z. Bažant,et al.  Nonlocal Continuum Damage, Localization Instability and Convergence , 1988 .

[117]  L. J. Sluys,et al.  From continuous to discontinuous failure in a gradient-enhanced continuum damage model , 2003 .

[118]  Kenneth Runesson,et al.  Element-Embedded Localization Band Based on Regularized Displacement Discontinuity , 1996 .

[119]  Ted Belytschko,et al.  A finite element method for crack growth without remeshing , 1999 .

[120]  E. Aifantis On the Microstructural Origin of Certain Inelastic Models , 1984 .