Geometrically exact beam finite element formulated on the special Euclidean group SE (3) V Sonneville, A Cardona, O Brüls Computer Methods in Applied Mechanics and Engineering 268, 451-474, 2014 | 194 | 2014 |
Validation of flexible multibody dynamics beam formulations using benchmark problems OA Bauchau, P Betsch, A Cardona, J Gerstmayr, B Jonker, P Masarati, ... Multibody system dynamics 37, 29-48, 2016 | 90 | 2016 |
A formulation on the special Euclidean group for dynamic analysis of multibody systems V Sonneville, O Brüls Journal of Computational and Nonlinear Dynamics 9 (4), 041002, 2014 | 50 | 2014 |
Interpolation schemes for geometrically exact beams: a motion approach V Sonneville, O Brüls, OA Bauchau International Journal for Numerical Methods in Engineering 112 (9), 1129-1153, 2017 | 44 | 2017 |
A nonlinear finite element formalism for modelling flexible and soft manipulators S Grazioso, V Sonneville, G Di Gironimo, O Bauchau, B Siciliano 2016 IEEE international conference on simulation, modeling, and programming …, 2016 | 31 | 2016 |
A geometric local frame approach for flexible multibody systems V Sonneville ULiège-Université de Liège, 2015 | 30 | 2015 |
Sensitivity analysis for multibody systems formulated on a Lie group V Sonneville, O Brüls Multibody System Dynamics 31, 47-67, 2014 | 29 | 2014 |
Geometric interpretation of a non-linear beam finite element on the Lie group SE (3) V Sonneville, A Cardona, O Brüls Archive of Mechanical Engineering 61 (2), 305-329, 2014 | 28 | 2014 |
A geometric optimization method for the trajectory planning of flexible manipulators A Lismonde, V Sonneville, O Brüls Multibody System Dynamics 47 (4), 347-362, 2019 | 25 | 2019 |
Discrete adjoint method for the sensitivity analysis of flexible multibody systems A Callejo, V Sonneville, OA Bauchau Journal of Computational and Nonlinear Dynamics 14 (2), 021001, 2019 | 24 | 2019 |
Modal reduction procedures for flexible multibody dynamics V Sonneville, M Scapolan, M Shan, OA Bauchau Multibody System Dynamics 51, 377-418, 2021 | 17 | 2021 |
On the equivalent static load method for flexible multibody systems described with a nonlinear finite element formalism E Tromme, V Sonneville, O Brüls, P Duysinx International Journal for Numerical Methods in Engineering 108 (6), 646-664, 2016 | 16 | 2016 |
System-wise equivalent static loads for the design of flexible mechanisms E Tromme, V Sonneville, JK Guest, O Brüls Computer Methods in Applied Mechanics and Engineering 329, 312-331, 2018 | 14 | 2018 |
Trajectory planning of soft link robots with improved intrinsic safety A Lismonde, V Sonneville, O Brüls IFAC-PapersOnLine 50 (1), 6016-6021, 2017 | 13 | 2017 |
High-fidelity multidisciplinary design optimization methodology with application to rotor blades L Wang, B Diskin, RT Biedron, EJ Nielsen, V Sonneville, OA Bauchau Journal of the American Helicopter Society 64 (3), 1-11, 2019 | 11 | 2019 |
Contact model between superelements in dynamic multibody systems G Virlez, O Brüls, V Sonneville, E Tromme, P Duysinx, M Géradin International Design Engineering Technical Conferences and Computers and …, 2013 | 9 | 2013 |
Parallel implementation of comprehensive rotor dynamics simulation based on the motion formalism V Sonneville, OA Bauchau Proceedings of the American Helicopter Society 73rd Annual Forum, 2017 | 6 | 2017 |
Formulation of kinematic joints and rigidity constraints in multibody dynamics using a Lie group approach V Sonneville, O Bruls 2nd Joint International Conference on Multibody System Dynamics (IMSD), 2012 | 5 | 2012 |
A Few Good Reasons to Consider a Beam Finite Element Formulation on the Lie Group SE(3) V Sonneville, O Brüls International Design Engineering Technical Conferences and Computers and …, 2013 | 4 | 2013 |
Formulation of shell elements based on the motion formalism O Bauchau, V Sonneville Applied Mechanics 2 (4), 1009-1036, 2021 | 3 | 2021 |