  | Detroux, T., Noël, J.-P., & Kerschen, G. (2021). Tailoring the resonances of nonlinear mechanical systems. Nonlinear Dynamics, 103 (4), 3611 - 3624. doi:10.1007/s11071-020-06002-w  Peer reviewed |
 | Detroux, T., Noël, J.-P., Virgin, L., & Kerschen, G. (27 March 2018). Experimental study of isolas in nonlinear systems featuring modal interactions. PLoS ONE, 13 (3), 0194452. doi:10.1371/journal.pone.0194452 Peer Reviewed verified by ORBi |
 | Lee, J., Kerschen, G., & Detroux, T. (24 July 2017). HARMONIC BALANCE COMPUTATION OF THE NONLINEAR FREQUENCY RESPONSE OF A THIN PLATE [Paper presentation]. 24th International Congress on Sound and Vibration, London, United Kingdom. |
  | Detroux, T., Dossogne, T., Masset, L., Noël, J.-P., & Kerschen, G. (October 2016). Analysis of the Nonlinear Dynamics of an F-16 Aircraft Using the NI2D Toolbox [Paper presentation]. GDR DYNOLIN 3437 (2016). |
 | Detroux, T., Noël, J.-P., Masset, L., & Kerschen, G. (September 2016). Nonlinear vibration analysis of the SmallSat spacecraft: From identification to design [Paper presentation]. 14th European Conference on Spacecraft Structures, Materials and Environmental Testing, Toulouse, France. |
 | Detroux, T., Noël, J.-P., & Kerschen, G. (July 2016). On the relations between nonlinear resonances and nonlinear normal modes [Paper presentation]. 6th International Conference on Nonlinear Vibrations, Localization and Energy Transfer, Liège, Belgium. |
 | Noël, J.-P., Gourc, E., Grappasonni, C., Detroux, T., & Kerschen, G. (2016). Identification of nonlinear frequency responses and bifurcations from experimental data. In Actes de CFA/VISHNO 2016. |
 | Detroux, T. (2016). Performance and Robustness of Nonlinear Systems Using Bifurcation Analysis [Doctoral thesis, ULiège - Université de Liège]. ORBi-University of Liège. https://orbi.uliege.be/handle/2268/195883 |
 | Gourc, E., Grappasonni, C., Noël, J.-P., Detroux, T., & Kerschen, G. (2016). Obtaining nonlinear frequency responses from broadband testing. In Proceedings of the International Modal Analysis Conference (IMAC) XXXIV. doi:10.1007/978-3-319-29739-2_20 |
 | Detroux, T., Noël, J.-P., Kerschen, G., & Virgin, L. N. (2016). Experimental study of isolated response curves in a two-degree-of-freedom nonlinear system. In Proceedings of the International Modal Analysis Conference (IMAC) XXXIV. doi:10.1007/978-3-319-29739-2_21 |
 | Detroux, T., Renson, L., Masset, L., & Kerschen, G. (November 2015). The harmonic balance method for bifurcation analysis of large-scale nonlinear mechanical systems. Computer Methods in Applied Mechanics and Engineering, 296, 18-38. doi:10.1016/j.cma.2015.07.017 Peer Reviewed verified by ORBi |
 | Kuether, R. J., Renson, L., Detroux, T., Grappasonni, C., Kerschen, G., & Allen, M. S. (01 September 2015). Nonlinear normal modes, modal interactions and isolated resonance curves. Journal of Sound and Vibration, 351, 299–310. doi:10.1016/j.jsv.2015.04.035 Peer Reviewed verified by ORBi |
 | Detroux, T., Renson, L., Masset, L., & Kerschen, G. (26 August 2015). The harmonic balance method for bifurcation analysis of large-scale nonlinear mechanical systems [Paper presentation]. Congrès Français de Mécanique 2015, Lyon, France. |
 | Noël, J.-P., Detroux, T., Masset, L., Kerschen, G., & Virgin, L. (2015). Isolated response curves in a base-excited, two-degree-of-freedom, nonlinear system. In Proceedings of the ASME 2015 International Design Engineering Technical Conferences. doi:10.1115/DETC2015-46106 Peer reviewed |
 | Detroux, T., Renson, L., Masset, L., Noël, J.-P., & Kerschen, G. (2015). Bifurcation analysis of a spacecraft structure using the harmonic balance method. In Proceedings of the ASME 2015 International Design Engineering Technical Conferences. doi:10.1115/DETC201546259 Peer reviewed |
 | Detroux, T., Habib, G., Masset, L., & Kerschen, G. (August 2015). Performance, robustness and sensitivity analysis of the nonlinear tuned vibration absorber. Mechanical Systems and Signal Processing, 60-61, 799–809. doi:10.1016/j.ymssp.2015.01.035 Peer Reviewed verified by ORBi |
 | Detroux, T., Noël, J.-P., Masset, L., Kerschen, G., & Virgin, L. N. (2015). Numerical study of intrinsic features of isolas in a 2-dof nonlinear system. In Proceedings of the ICEDyn conference. |
 | Detroux, T., Renson, L., Masset, L., & Kerschen, G. (2015). Bifurcation analysis of large-scale dynamical systems using the harmonic balance method. In Proceedings of the 12th Colloque National en Calcul des Structures (CSMA). |
Grappasonni, C., Habib, G., Detroux, T., & Kerschen, G. (01 April 2015). The nonlinear tuned vibration absorber in practice [Paper presentation]. International Conference on Advances in Vibrations, Porto, Portugal. |
 | Habib, G., Detroux, T., Viguié, R., & Kerschen, G. (February 2015). Nonlinear generalization of Den Hartog׳s equal-peak method. Mechanical Systems and Signal Processing, 52-53, 17-28. doi:10.1016/j.ymssp.2014.08.009 Peer Reviewed verified by ORBi |
 | Grappasonni, C., Habib, G., Detroux, T., & Kerschen, G. (2015). Experimental demonstration of a 3D-printed nonlinear tuned vibration absorber. In Proceedings of the International Modal Analysis Conference (IMAC) XXXIII. doi:10.1007/978-3-319-15221-9_15 |
 | Detroux, T., Renson, L., Masset, L., & Kerschen, G. (2015). The harmonic balance method for bifurcation analysis of nonlinear mechanical systems. In Proceedings of the International Modal Analysis Conference (IMAC) XXXIII. doi:10.1007/978-3-319-15221-9_5 |
 | Grappasonni, C., Habib, G., Detroux, T., Wang, F., Kerschen, G., & Jensen, J. S. (2014). Practical design of a nonlinear tuned vibration absorber. In Proceedings of the ISMA 2014 conference. |
 | Detroux, T., & Kerschen, G. (08 July 2014). Continuation of bifurcations of periodic solutions based on the harmonic balance method [Paper presentation]. 8th European Nonlinear Dynamics Conference (ENOC 2014), Vienna, Austria. |
 | Detroux, T., Habib, G., Masset, L., & Kerschen, G. (2014). The nonlinear tuned vibration absorber, part II: Robustness and sensitivity analysis. In Proceedings of the 5th Conference on Nonlinear Vibrations, Localization and Energy Transfer (NV 2014). |
 | Habib, G., Detroux, T., & Kerschen, G. (2014). The nonlinear tuned vibration absorber, part I: Design and performance analysis. In Proceedings of the 5th Conference on Nonlinear Vibrations, Localization and Energy Transfer (NV 2014). |
 | Detroux, T., Starosvetsky, Y., Kerschen, G., & Vakakis, A. F. (23 January 2014). Classification of periodic orbits of two-dimensional homogeneous granular crystals with no pre-compression. Nonlinear Dynamics, 76 (April 2014), 673-696. doi:10.1007/s11071-013-1160-9 Peer reviewed |
 | Detroux, T., Renson, L., & Kerschen, G. (2014). The harmonic balance method for advanced analysis and design of nonlinear mechanical systems. In Proceedings of the International Modal Analysis Conference (IMAC) XXXII. doi:10.1007/978-3-319-04522-1_3 |
 | Habib, G., Detroux, T., & Kerschen, G. (2014). Generalization of Den Hartog's Equal-Peak Method for nonlinear primary systems. In Proceedings of the International Conference on Structural Nonlinear Dynamics and Diagnosis. doi:10.1051/matecconf/20141601005 |
 | Detroux, T., Masset, L., & Kerschen, G. (2013). Performance and Robustness of the Nonlinear Tuned Vibration Absorber. In Proceedings of the GDR DYNOLIN 3437 (2015). |