Accurate stress fields of post-buckled laminated composite beams accounting for various kinematics

[1]  M. Amabili,et al.  Nonlinear higher-order shell theory for incompressible biological hyperelastic materials , 2019, Computer Methods in Applied Mechanics and Engineering.

[2]  Marco Amabili,et al.  Nonlinear Mechanics of Shells and Plates in Composite, Soft and Biological Materials , 2018 .

[3]  Erasmo Carrera,et al.  Frequency and mode change in the large deflection and post-buckling of compact and thin-walled beams , 2018, Journal of Sound and Vibration.

[4]  Erasmo Carrera,et al.  Unified formulation of geometrically nonlinear refined beam theories , 2018 .

[5]  E. Carrera,et al.  Dynamic Analyses of Axisymmetric Rotors Through Three-Dimensional Approaches and High-Fidelity Beam Theories , 2017 .

[6]  E. Carrera,et al.  Various refined theories applied to damped viscoelastic beams and circular rings , 2017 .

[7]  Erasmo Carrera,et al.  Large-deflection and post-buckling analyses of laminated composite beams by Carrera Unified Formulation , 2017 .

[8]  Humberto Breves Coda,et al.  Triangular based prismatic finite element for the analysis of orthotropic laminated beams, plates and shells , 2017 .

[9]  Humberto Breves Coda,et al.  Zig-Zag effect without degrees of freedom in linear and non linear analysis of laminated plates and shells , 2017 .

[10]  Rodrigo Ribeiro Paccola,et al.  A positional Unconstrained Vector Layerwise (UVLWT) FEM formulation for laminated frame element modeling , 2016 .

[11]  H. B. Coda Continuous inter-laminar stresses for regular and inverse geometrically non linear dynamic and static analyses of laminated plates and shells , 2015 .

[12]  Erasmo Carrera,et al.  Dynamic response of aerospace structures by means of refined beam theories , 2015 .

[13]  Erasmo Carrera,et al.  Application of a Refined Multi-Field Beam Model for the Analysis of Complex Configurations , 2015 .

[14]  Erasmo Carrera,et al.  Finite Element Analysis of Structures through Unified Formulation , 2014 .

[15]  Erasmo Carrera,et al.  Free vibration analysis of civil engineering structures by component-wise models , 2014 .

[16]  Canhui Zhang,et al.  A systematic and quantitative method to determine the optimal assumed stress fields for hybrid stress finite elements , 2014 .

[17]  O. C. Zienkiewicz,et al.  The Finite Element Method for Solid and Structural Mechanics , 2013 .

[18]  Erasmo Carrera,et al.  Refined One-Dimensional Formulations for Laminated Structure Analysis , 2012 .

[19]  Erasmo Carrera,et al.  Refined beam elements with only displacement variables and plate/shell capabilities , 2012 .

[20]  Samir A. Emam Analysis of shear-deformable composite beams in postbuckling , 2011 .

[21]  Gaetano Giunta,et al.  Beam Structures: Classical and Advanced Theories , 2011 .

[22]  G. Rao,et al.  Post-buckling analysis of composite beams: Simple and accurate closed-form expressions , 2010 .

[23]  Olivier Polit,et al.  Assessment of the refined sinus model for the non-linear analysis of composite beams , 2009 .

[24]  P. Frank Pai,et al.  Highly Flexible Structures : Modeling, Computation, and Experimentation , 2007 .

[25]  T. Pian,et al.  Hybrid and Incompatible Finite Element Methods , 2005 .

[26]  Dewey H. Hodges,et al.  A generalized Vlasov theory for composite beams , 2005 .

[27]  Erasmo Carrera,et al.  A unified formulation to assess theories of multilayered plates for various bending problems , 2005 .

[28]  E. Carrera On the use of the Murakami's zig-zag function in the modeling of layered plates and shells , 2004 .

[29]  E. Carrera Historical review of Zig-Zag theories for multilayered plates and shells , 2003 .

[30]  Tarun Kant,et al.  Analytical solutions for the static analysis of laminated composite and sandwich plates based on a higher order refined theory , 2002 .

[31]  Daniel J. Inman,et al.  A C1 finite element capable of interlaminar stress continuity , 2001 .

[32]  L. Vu-Quoc,et al.  Geometrically exact sandwich shells: The dynamic case , 2000 .

[33]  Mikhail Itskov,et al.  Composite laminates: nonlinear interlaminar stress analysis by multi-layer shell elements , 2000 .

[34]  E. Carrera,et al.  An evaluation of geometrical nonlinear effects of thin and moderately thick multilayered composite shells , 1997 .

[35]  J. Reddy Mechanics of laminated composite plates and shells : theory and analysis , 1996 .

[36]  E. Carrera C0 REISSNER–MINDLIN MULTILAYERED PLATE ELEMENTS INCLUDING ZIG-ZAG AND INTERLAMINAR STRESS CONTINUITY , 1996 .

[37]  Deokjoo Kim,et al.  Full and von Karman geometrically nonlinear analyses of laminated cylindrical panels , 1995 .

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

[39]  Erasmo Carrera,et al.  A study on arc-length-type methods and their operation failures illustrated by a simple model , 1994 .

[40]  J. N. Reddy,et al.  Modelling of thick composites using a layerwise laminate theory , 1993 .

[41]  Ozden O. Ochoa,et al.  Finite Element Analysis of Composite Laminates , 1992 .

[42]  N. Iyengar,et al.  Nonlinear bending of thin and thick unsymmetrically laminated composite beams using refined finite element model , 1992 .

[43]  Rakesh K. Kapania,et al.  Recent advances in analysis of laminated beams and plates. Part I - Sheareffects and buckling. , 1989 .

[44]  Rakesh K. Kapania,et al.  Recent Advances in Analysis of Laminated Beams and Plates, Part II: Vibrations and Wave Propagation , 1989 .

[45]  R. Kapania,et al.  Nonlinear vibrations of unsymmetrically laminated beams , 1987 .

[46]  Hidenori Murakami,et al.  Laminated Composite Plate Theory With Improved In-Plane Responses , 1986 .

[47]  E. Reissner On a mixed variational theorem and on shear deformable plate theory , 1986 .

[48]  J. Reddy A Simple Higher-Order Theory for Laminated Composite Plates , 1984 .

[49]  E. Reissner On a certain mixed variational theorem and a proposed application , 1984 .

[50]  M. Crisfield An arc‐length method including line searches and accelerations , 1983 .

[51]  M. Crisfield A FAST INCREMENTAL/ITERATIVE SOLUTION PROCEDURE THAT HANDLES "SNAP-THROUGH" , 1981 .

[52]  N. J. Pagano,et al.  Elastic Behavior of Multilayered Bidirectional Composites , 1972 .

[53]  N. Pagano,et al.  Exact Solutions for Composite Laminates in Cylindrical Bending , 1969 .

[54]  L. Vu-Quoc,et al.  Efficient Hybrid-EAS solid element for accurate stress prediction in thick laminated beams, plates, and shells , 2013 .

[55]  Erasmo Carrera,et al.  Evaluation of Layerwise Mixed Theories for Laminated Plates Analysis , 1998 .

[56]  Tarun Kant,et al.  Transient dynamics of laminated beams: an evaluation with a higher-order refined theory , 1998 .

[57]  E. Carrera,et al.  Zig-Zag and interlaminar equilibria effects in large deflection and postbuckling analysis of multilayered plates , 1997 .

[58]  C. T. Sun,et al.  A three-dimensional hybrid stress isoparametric element for the analysis of laminated composite plates , 1987 .

[59]  S. Timoshenko,et al.  X. On the transverse vibrations of bars of uniform cross-section , 1922 .