Continuum and discrete models for structures including (quasi-) inextensible elasticae with a view to the design and modeling of composite reinforcements

Abstract Inspired by some composite fiber reinforcements used in aeronautical engineering and by the need of conceiving new metamaterials, some discrete models including (quasi-) inextensible elasticae are considered. A class of continuum models approximately describing the macroscopic mechanical behavior of introduced structures is then heuristically proposed. Some of these continuum models can be regarded as a special kind of second-gradient elastic media, in which the higher-gradient elasticity is conferred by the flexural stiffnesses of elasticae constituting the microscopic lattice. The discrete models are studied by means of suitably tailored numerical codes designed to avoid numerical instabilities and locking and a comparison of discrete versus continuum models is attempted. The obtained results show that the theory of generalized continua may be useful in some engineering applications and it plays a relevant role in the mechanics of woven composites. The introduced discrete and continuum models are used to describe the so-called bias extension test on woven fabrics and it is shown that a good choice to correctly reproduce the targeted phenomenology is to use a second gradient continuum theory. However, as discussed throughout the paper, in the context of rigorous micro–macro identification procedures there still remain many open problems to be solved, especially when dealing with systems subjected to particular constraints, such as inextensibility.

[1]  James A. Sherwood,et al.  Characterization of mechanical behavior of woven fabrics: Experimental methods and benchmark results , 2008 .

[2]  P. Germain,et al.  The Method of Virtual Power in Continuum Mechanics. Part 2: Microstructure , 1973 .

[3]  T Christian Gasser,et al.  Nonlinear elasticity of biological tissues with statistical fibre orientation , 2010, Journal of The Royal Society Interface.

[4]  Francesco dell’Isola,et al.  Modelling the onset of shear boundary layers in fibrous composite reinforcements by second gradient theory , 2013 .

[5]  Philippe Boisse,et al.  Locking in simulation of composite reinforcement deformations. Analysis and treatment , 2013 .

[6]  T. Pence,et al.  Remarks on the Behavior of Simple Directionally Reinforced Incompressible Nonlinearly Elastic Solids , 1997 .

[7]  Y. Lanir Constitutive equations for fibrous connective tissues. , 1983, Journal of biomechanics.

[8]  R. Toupin,et al.  Theories of elasticity with couple-stress , 1964 .

[9]  Pierre Seppecher,et al.  Truss Modular Beams with Deformation Energy Depending on Higher Displacement Gradients , 2003 .

[10]  Ignacio Carol,et al.  On inter‐element forces in the FEM‐displacement formulation, and implications for stress recovery , 2006 .

[11]  Carlo Poggi,et al.  Numerical analysis of fire effects on beam structures , 1988 .

[12]  R. D. Mindlin,et al.  On first strain-gradient theories in linear elasticity , 1968 .

[13]  J. Huetink,et al.  Large deformation simulation of anisotropic material using an updated Lagrangian finite element method , 2007 .

[14]  Leopoldo Greco,et al.  A variational model based on isogeometric interpolation for the analysis of cracked bodies , 2014 .

[15]  R. Rivlin,et al.  Simple force and stress multipoles , 1964 .

[16]  Adrien Charmetant,et al.  Hyperelastic model for large deformation analyses of 3D interlock composite preforms , 2012 .

[17]  L. Contrafatto,et al.  Stress rate formulation for elastoplastic models with internal variables based on augmented Lagrangian regularisation , 2000 .

[18]  Emanuele Reccia,et al.  FEM-DEM Modeling for Out-of-plane Loaded Masonry Panels: A Limit Analysis Approach , 2012 .

[19]  P. Seppecher,et al.  Determination of the Closure of the Set of Elasticity Functionals , 2003 .

[20]  Antonio Cazzani,et al.  Numerical aspects of coupling strongly frequency-dependent soil–foundation models with structural finite elements in the time-domain , 2012 .

[21]  Patrizio Neff,et al.  Existence, Uniqueness and Stability in Linear Cosserat Elasticity for Weakest Curvature Conditions , 2010 .

[22]  Chokri Cherif,et al.  Experimental and computational composite textile reinforcement forming: A review , 2013 .

[23]  A. Pipkin Equilibrium of Tchebychev nets , 1984 .

[24]  Victor A. Eremeyev,et al.  Material symmetry group of the non-linear polar-elastic continuum , 2012 .

[25]  P. Boisse,et al.  Analyses of the Deformation Mechanisms of Non-Crimp Fabric Composite Reinforcements during Preforming , 2012, Applied Composite Materials.

[26]  R. Ogden,et al.  Hyperelastic modelling of arterial layers with distributed collagen fibre orientations , 2006, Journal of The Royal Society Interface.

[27]  Emmanuelle Vidal-Salle,et al.  Simulation of wrinkling during textile composite reinforcement forming. Influence of tensile, in-plane shear and bending stiffnesses , 2011 .

[28]  Fabrizio Vestroni,et al.  On nonlinear dynamics of planar shear indeformable beams , 1986 .

[29]  R. S. Rivlin,et al.  Multipolar continuum mechanics , 1964 .

[30]  Alfio Grillo,et al.  Elasticity and permeability of porous fibre-reinforced materials under large deformations , 2012 .

[31]  G. Ventura,et al.  An explicit formulation of the Green's operator for general one-dimensional structures , 2002 .

[32]  P. Seppecher,et al.  CLOSURE OF THE SET OF DIFFUSION FUNCTIONALS WITH RESPECT TO THE MOSCO-CONVERGENCE , 2002 .

[33]  Antonio Carcaterra,et al.  ENERGY FLOW UNCERTAINTIES IN VIBRATING SYSTEMS: DEFINITION OF A STATISTICAL CONFIDENCE FACTOR , 2003 .

[34]  Static and dynamic consistent perturbation analysis for nonlinear inextensible planar frames , 2013 .

[35]  Alfio Grillo,et al.  Poroelastic materials reinforced by statistically oriented fibres—numerical implementation and application to articular cartilage , 2014 .

[36]  W. T. Koiter Couple-stresses in the theory of elasticity , 1963 .

[37]  Angelo Luongo,et al.  Interactive buckling of an elastically restrained truss structure , 1994 .

[38]  I. Verpoest,et al.  Model of shear of woven fabric and parametric description of shear resistance of glass woven reinforcements , 2006 .

[39]  F. dell'Isola,et al.  Analytical continuum mechanics à la Hamilton–Piola least action principle for second gradient continua and capillary fluids , 2013, 1305.6744.

[40]  Leopoldo Greco,et al.  B-Spline interpolation of Kirchhoff-Love space rods , 2013 .

[41]  Ignace Verpoest,et al.  Optical strain fields in shear and tensile testing of textile reinforcements , 2008 .

[42]  Antonio Carcaterra,et al.  Transient energy exchange between a primary structure and a set of oscillators: return time and apparent damping. , 2004, The Journal of the Acoustical Society of America.

[43]  Maurizio Porfiri,et al.  Circuit analog of a beam and its application to multimodal vibration damping, using piezoelectric transducers , 2004, Int. J. Circuit Theory Appl..

[44]  Angelo Luongo,et al.  Mode Localization in Dynamics and Buckling of Linear Imperfect Continuous Structures , 2001 .

[45]  Antonio Carcaterra,et al.  An Entropy Formulation for the Analysis of Energy Flow Between Mechanical Resonators , 2002 .

[47]  W. Pietraszkiewicz,et al.  Local Symmetry Group in the General Theory of Elastic Shells , 2006 .

[48]  Annie Raoult,et al.  Symmetry groups in nonlinear elasticity: an exercise in vintage mathematics , 2008 .

[49]  R. Ogden,et al.  A New Constitutive Framework for Arterial Wall Mechanics and a Comparative Study of Material Models , 2000 .

[50]  M. Pignataro,et al.  Multiple interaction and localization phenomena in the postbuckling of compressed thin-walled members , 1988 .

[51]  David J. Steigmann,et al.  Equilibrium of elastic nets , 1991, Philosophical Transactions of the Royal Society of London. Series A: Physical and Engineering Sciences.

[52]  R. Ogden,et al.  Mechanical response of fiber-reinforced incompressible non-linearly elastic solids , 2005 .

[53]  A. Cemal Eringen,et al.  NONLINEAR THEORY OF SIMPLE MICRO-ELASTIC SOLIDS-I , 1964 .

[54]  Luca Placidi,et al.  Wave propagation in relaxed micromorphic continua: modeling metamaterials with frequency band-gaps , 2013, 1309.1722.

[55]  F. dell'Isola,et al.  A micro-structured continuum modelling compacting fluid-saturated grounds: the effects of pore-size scale parameter , 1998 .

[56]  R. Rivlin,et al.  On cauchy's equations of motion , 1964 .

[57]  Pierre Seppecher,et al.  Linear elastic trusses leading to continua with exotic mechanical interactions , 2011 .

[58]  Y. Bréchet,et al.  Strain gradient elastic homogenization of bidimensional cellular media , 2010 .

[59]  L. Contrafatto,et al.  A globally convergent numerical algorithm for damaging elasto‐plasticity based on the Multiplier method , 2005 .

[60]  R. D. Mindlin Second gradient of strain and surface-tension in linear elasticity , 1965 .

[61]  A. Spencer,et al.  Deformations of fibre-reinforced materials, , 1972 .

[62]  P. Neff,et al.  On constitutive and configurational aspects of models for gradient continua with microstructure , 2009 .

[63]  Leopoldo Greco,et al.  An implicit G1 multi patch B-spline interpolation for Kirchhoff–Love space rod , 2014 .

[64]  J. Bleustein A note on the boundary conditions of toupin's strain-gradient theory , 1967 .

[65]  Antonio Carcaterra,et al.  Energy sinks: Vibration absorption by an optimal set of undamped oscillators , 2005 .

[66]  A. Pipkin,et al.  Some developments in the theory of inextensible networks , 1980 .

[67]  Francesco dell’Isola,et al.  Control of sound radiation and transmission by a piezoelectric plate with an optimized resistive electrode , 2010 .

[68]  Andrew C. Long,et al.  Finite element forming simulation for non-crimp fabrics using a non-orthogonal constitutive equation , 2005 .

[69]  E. Kuznetsov Underconstrained structural systems , 1991 .

[70]  Stéphane Hans,et al.  Generalized Beams and Continua. Dynamics of Reticulated Structures , 2010 .

[71]  Patrizio Neff,et al.  Existence of minimizers for a finite-strain micromorphic elastic solid , 2006, Proceedings of the Royal Society of Edinburgh: Section A Mathematics.

[72]  Debes Bhattacharyya,et al.  Modelling approach for the prediction of stitch influence during woven fabric draping , 2011 .

[73]  Angelo Luongo,et al.  Linear and non-linear interactions between static and dynamic bifurcations of damped planar beams , 2007 .

[74]  P. Boisse Composite Fiber Reinforcement Forming , 2011 .

[75]  F. dell'Isola,et al.  Modeling and design of passive electric networks interconnecting piezoelectric transducers for distributed vibration control , 2003 .

[76]  Albert Edward Green,et al.  Multipolar continuum mechanics: functional theory I , 1965, Proceedings of the Royal Society of London. Series A. Mathematical and Physical Sciences.

[77]  Silvio Levy,et al.  The Forgotten Revolution: How Science Was Born in 300 BC and Why it Had to Be Reborn , 2004 .

[78]  Patrizio Neff,et al.  A Geometrically Exact Micromorphic Model for Elastic Metallic Foams Accounting for Affine Microstructure. Modelling, Existence of Minimizers, Identification of Moduli and Computational Results , 2007 .

[79]  Pierre Seppecher,et al.  A second gradient material resulting from the homogenization of an heterogeneous linear elastic medium , 1997 .

[80]  G. Ventura,et al.  Complementary energy approach to contact problems based on consistent augmented Lagrangian formulation , 1998 .

[81]  Antonio Maria Cazzani,et al.  An unsymmetric stress formulation for reissner-mindlin plates: a simple and locking-free rectangular element , 2004, Int. J. Comput. Eng. Sci..

[82]  Francesco dell’Isola,et al.  The complete works of Gabrio Piola: Volume I Commented English Translation - English and Italian Edition , 2014 .

[83]  Philippe Boisse,et al.  A semi‐discrete shell finite element for textile composite reinforcement forming simulation , 2009 .

[84]  Michael J. King,et al.  A continuum constitutive model for the mechanical behavior of woven fabrics including slip and failure , 2005 .

[85]  Pierre Badel,et al.  Rate constitutive equations for computational analyses of textile composite reinforcement mechanical behaviour during forming , 2009 .

[86]  Andrew C. Long,et al.  Normalization of Shear Test Data for Rate-independent Compressible Fabrics , 2008 .

[87]  Francesco dell’Isola,et al.  A Two-Dimensional Gradient-Elasticity Theory for Woven Fabrics , 2015 .

[88]  Alfio Grillo,et al.  A transversely isotropic composite with a statistical distribution of spheroidal inclusions: a geometrical approach to overall properties , 2004 .

[89]  Ugo Andreaus,et al.  At the origins and in the vanguard of peridynamics, non-local and higher-gradient continuum mechanics: An underestimated and still topical contribution of Gabrio Piola , 2013, 1310.5599.

[90]  Luca Placidi,et al.  A unifying perspective: the relaxed linear micromorphic continuum , 2013, Continuum Mechanics and Thermodynamics.

[91]  R. D. Mindlin Micro-structure in linear elasticity , 1964 .

[92]  G. Oliveto,et al.  Incremental analysis of plane frames with geometric and material nonlinearities , 1988 .

[93]  James A. Sherwood,et al.  Characterization of the tool/fabric and fabric/fabric friction for woven-fabric composites during the thermostamping process , 2013 .

[94]  A. Cemal Eringen,et al.  Nonlinear theory of micro-elastic solids—II☆ , 1964 .

[95]  Y. Bréchet,et al.  Derivation of anisotropic matrix for bi-dimensional strain-gradient elasticity behavior , 2009 .

[96]  A.J.M. Spencer,et al.  Finite deformations of fibre-reinforced elastic solids with fibre bending stiffness , 2007 .

[97]  F. dell’Isola,et al.  Dynamics of solids with microperiodic nonconnected fluid inclusions , 1997 .

[98]  A. Eringen Microcontinuum Field Theories , 2020, Advanced Continuum Theories and Finite Element Analyses.

[99]  H. F. Tiersten,et al.  Effects of couple-stresses in linear elasticity , 1962 .

[100]  Philippe Boisse,et al.  Tension locking in finite-element analyses of textile composite reinforcement deformation , 2013 .

[101]  Walter Herzog,et al.  Towards an analytical model of soft biological tissues. , 2008, Journal of biomechanics.

[102]  Jun Wang,et al.  The draping of woven fabric preforms and prepregs for production of polymer composite components , 1999 .

[103]  R. Toupin Elastic materials with couple-stresses , 1962 .

[104]  Adrien Charmetant,et al.  Hyperelastic modelling for mesoscopic analyses of composite reinforcements , 2011 .

[105]  A. Pipkin,et al.  PLANE TRACTION PROBLEMS FOR INEXTENSIBLE NETWORKS , 1981 .

[106]  Angelo Luongo On the amplitude modulation and localization phenomena in interactive buckling problems , 1991 .

[107]  A. Luongo A Transfer Matrix-Perturbation Approach to the Buckling Analysis of Nonlinear Periodic Structures , 1995 .

[108]  A. Cazzani,et al.  On some mixed finite element methods for plane membrane problems , 1997 .