Moreno Miranda, B., Sonneville, V., Foguenne, L., Schwartz, C., Sacré, P., & Bruls, O. (17 July 2025). Comparative Study of two Biomechanics Frameworks for Upper Limb Exoskeleton Simulations [Paper presentation]. 12th ECCOMAS Thematic Conference on Multibody Dynamics, Innsbruck, Austria. |
Géradin, M., & Sonneville, V. (2024). A two-field approach to multibody dynamics of rotating flexible bodies. Multibody System Dynamics. doi:10.1007/s11044-023-09912-w |
Sonneville, V., & Géradin, M. (2022). Two-field formulation of the inertial forces of a geometrically-exact beam element. Multibody System Dynamics. doi:10.1007/s11044-022-09867-4 |
Bosten, A., Linn, J., Doerlich, V., Sonneville, V., Cosimo, A., & Bruls, O. (21 September 2020). Formulation of line-to-line contact conditions between flexible beams with circular cross-sections [Paper presentation]. Symposium on flexible multibody system dynamics, Innsbruck, Austria. |
Tromme, E., Sonneville, V., Bruls, O., & Duysinx, P. (02 July 2015). Optimal design of flexible mechanisms using the Equivalent Static Load method and a Lie group formalism [Paper presentation]. ECCOMAS Thematic Conference on Multibody Dynamics, Barcelone, Spain. |
Sonneville, V., Cardona, A., & Bruls, O. (July 2015). Exploiting frame-invariant operators for the efficient numerical simulation of flexible multibody systems [Paper presentation]. ECCOMAS Thematic Conference on Multibody Dynamics. |
Dewalque, F., Sonneville, V., & Bruls, O. (22 July 2014). Nonlinear analysis of tape springs: Comparison of two geometrically exact finite element formulations [Paper presentation]. 11th World Congress on Computational Mechanics (WCCM XI) - 5th European Conference on Computational Mechanics (ECCM V), Barcelona, Spain. |
Sonneville, V., & Bruls, O. (11 July 2014). A formulation on the special Euclidean group for dynamic analysis of multibody systems. Journal of Computational and Nonlinear Dynamics, 9 (4), 041002. doi:10.1115/1.4026569 |
Sonneville, V., Cardona, A., & Bruls, O. (June 2014). Geometric interpretation of a non-linear beam finite element on the Lie group SE(3). Archive of Mechanical Engineering, 61 (2), 305-329. doi:10.2478/meceng-2014-0018 |
Sonneville, V., & Bruls, O. (January 2014). Sensitivity analysis for multibody systems formulated on a Lie group. Multibody System Dynamics, 31, 47-67. doi:10.1007/s11044-013-9345-z |
Sonneville, V., Cardona, A., & Bruls, O. (January 2014). Geometrically exact beam finite element formulated on the special Euclidean group SE(3). Computer Methods in Applied Mechanics and Engineering, 268, 451-474. doi:10.1016/j.cma.2013.10.008 |
Sonneville, V., & Bruls, O. (2013). A FEW GOOD REASONS TO CONSIDER A BEAM FINITE ELEMENT FORMULATION ON THE LIE GROUP SE(3). In Proceedings of the ASME 2013 International Design Engineering Technical Conference & Computers and Information in Engineering Conference IDETC/CIE 2013. doi:10.1115/DETC2013-13099 |
Virlez, G., Bruls, O., Sonneville, V., Tromme, E., Duysinx, P., & Géradin, M. (2013). Contact model between superelements in dynamic multibody systems. In Proceedings of ASME2013 International Design Engineering Technical Conference & Computers and Information in Engineering Conference IDETC/CIE 2013. doi:10.1115/DETC2013-13469 |
Bruls, O., & Sonneville, V. (February 2012). Sensitivity analysis for flexible multibody systems formulated on a Lie group [Paper presentation]. Euromech Colloquium 524, Multibody system modelling, control and simulation for engineering design, Enschede, Netherlands. |