First order sensitivity analysis of flexible multibody systems using absolute nodal coordinate formulation

[1]  Kurt S. Anderson,et al.  An efficient direct differentiation approach for sensitivity analysis of flexible multibody systems , 2010 .

[2]  Jorge Ambrósio,et al.  Sensitivity analysis of flexible multibody systems using composite materials components , 2009 .

[3]  Rudranarayan M. Mukherjee,et al.  A divide-and-conquer direct differentiation approach for multibody system sensitivity analysis , 2008 .

[4]  A. Shabana,et al.  Implicit and explicit integration in the solution of the absolute nodal coordinate differential/algebraic equations , 2008 .

[5]  O. Bauchau,et al.  Review of Contemporary Approaches for Constraint Enforcement in Multibody Systems , 2008 .

[6]  O. Bauchau,et al.  Review of Classical Approaches for Constraint Enforcement in Multibody Systems , 2008 .

[7]  Li-Qun Chen,et al.  Second order adjoint sensitivity analysis of multibody systems described by differential–algebraic equations , 2007 .

[8]  Dan Negrut,et al.  On an Implementation of the Hilber-Hughes-Taylor Method in the Context of Index 3 Differential-Algebraic Equations of Multibody Dynamics (DETC2005-85096) , 2007 .

[9]  Dan Negrut,et al.  A Discussion of Low Order Numerical Integration Formulas for Rigid and Flexible Multibody Dynamics , 2007 .

[10]  Aki Mikkola,et al.  Development of elastic forces for a large deformation plate element based on the absolute nodal coordinate formulation , 2006 .

[11]  Edward J. Haug,et al.  Implicit Numerical Integration for Design Sensitivity Analysis of Rigid Multibody Systems , 2005 .

[12]  J. Mayo,et al.  Efficient Evaluation of the Elastic Forces and the Jacobian in the Absolute Nodal Coordinate Formulation , 2004 .

[13]  A. Mikkola,et al.  Description of Elastic Forces in Absolute Nodal Coordinate Formulation , 2003 .

[14]  L. Petzold,et al.  Adjoint sensitivity analysis for differential-algebraic equations: algorithms and software☆ , 2002 .

[15]  Kurt S. Anderson,et al.  Recursive sensitivity analysis for constrained multi-rigid-body dynamic systems design optimization , 2002 .

[16]  R. Y. Yakoub,et al.  Three Dimensional Absolute Nodal Coordinate Formulation for Beam Elements: Implementation and Applications , 2001 .

[17]  Mohamed A. Omar,et al.  A TWO-DIMENSIONAL SHEAR DEFORMABLE BEAM FOR LARGE ROTATION AND DEFORMATION PROBLEMS , 2001 .

[18]  R. Serban,et al.  Identification and Identifiability of Unknown Parameters in Multibody Dynamic Systems , 2001 .

[19]  A. Shabana,et al.  Definition of the Elastic Forces in the Finite-Element Absolute Nodal Coordinate Formulation and the Floating Frame of Reference Formulation , 2001 .

[20]  A. Shabana,et al.  DEVELOPMENT OF SIMPLE MODELS FOR THE ELASTIC FORCES IN THE ABSOLUTE NODAL CO-ORDINATE FORMULATION , 2000 .

[21]  L. Petzold,et al.  Sensitivity analysis of differential-algebraic equations: A comparison of methods on a special problem ✩ , 2000 .

[22]  A. Shabana Computer Implementation of the Absolute Nodal Coordinate Formulation for Flexible Multibody Dynamics , 1998 .

[23]  E. Haug,et al.  Kinematic and Kinetic Derivatives in Multibody System Analysis , 1998 .

[24]  A. Shabana Definition of the Slopes and the Finite Element Absolute Nodal Coordinate Formulation , 1997 .

[25]  Ahmed A. Shabana,et al.  Flexible Multibody Dynamics: Review of Past and Recent Developments , 1997 .

[26]  J. P. Dias,et al.  Sensitivity Analysis of Rigid-Flexible Multibody Systems , 1997 .

[27]  Xiaojian Liu Sensitivity analysis of constrained flexible multibody systems with stability considerations , 1996 .

[28]  Christian Bischof,et al.  Adifor 2.0: automatic differentiation of Fortran 77 programs , 1996 .

[29]  Peter Eberhard,et al.  Analysis and optimization of complex multibody systems using advanced sensitivity analysis methods , 1996 .

[30]  D. Bestle,et al.  Sensitivity analysis of constrained multibody systems , 1992, Archive of Applied Mechanics.

[31]  D. Bestle,et al.  Analyzing and Optimizing Multibody Systems , 1992 .

[32]  Andreas Griewank,et al.  ADIFOR - Generating Derivative Codes form Fortran Programs , 1992, Sci. Program..

[33]  A. Griewank,et al.  On the calculation of Jacobian matrices by the Markowitz rule , 1991 .

[34]  R. Haftka,et al.  Computational aspects of sensitivity calculations in transient structural analysis , 1989 .

[35]  L. Petzold,et al.  Numerical methods and software for sensitivity analysis of differential-algebraic systems , 1986 .

[36]  P. Nikravesh,et al.  Optimal Design of Mechanical Systems With Constraint Violation Stabilization Method , 1985 .

[37]  R. Haftka,et al.  Elements of Structural Optimization , 1984 .

[38]  Edward J. Haug,et al.  Design Sensitivity Analysis and Optimization of Dynamically Driven Systems , 1984 .

[39]  Edward J. Haug,et al.  Second‐order design sensitivity analysis of mechanical system dynamics , 1982 .

[40]  Edward J. Haug,et al.  Design Sensitivity Analysis of Planar Mechanism and Machine Dynamics , 1981 .