  | Vion, A., & Geuzaine, C. (2016). Parallel Double Sweep Preconditioner for the Optimized Schwarz Algorithm Applied to High Frequency Helmholtz and Maxwell Equations. In Domain Decomposition Methods in Science and Engineering XXII (pp. 239-247). Springer.  Peer reviewed |
Marsic, N., Vion, A., & Geuzaine, C. (2015). Computational advances in quasi-optimal domain decomposition methods for time-harmonic electromagnetic wave problems [Paper presentation]. The 23rd International Conference on Domain Decomposition Methods (DD23), Jeju, South Korea. |
  | Vion, A. (2014). Multi-Domain Approaches for the Solution of High-Frequency Time-Harmonic Propagation Problems [Doctoral thesis, ULiège - Université de Liège]. ORBi-University of Liège. https://orbi.uliege.be/handle/2268/174920 |
 | Vion, A., & Geuzaine, C. (2014). Double Sweep Preconditioners for propagation problems solved by Optimized Schwarz Methods. In Proceedings of the 6th International Conference on Advanced COmputational Methods in ENgineering, ACOMEN 2014. Peer reviewed |
Vion, A., & Geuzaine, C. (May 2014). Parallel Double Sweep Preconditioner for the Optimized Schwarz Algorithm Applied to High Frequency Helmholtz and Maxwell Equations [Paper presentation]. ICMS Workshop on Challenges in medical imaging: numerics, high performance computing, inverse problems. |
 | Vion, A., & Geuzaine, C. (2014). Double sweep preconditioner for optimized Schwarz methods applied to the Helmholtz problem. Journal of Computational Physics, 266, 171-190. doi:10.1016/j.jcp.2014.02.015 Peer Reviewed verified by ORBi |
 | Vion, A., & Geuzaine, C. (2013). Optimized Schwarz Algorithm with Double Sweep Preconditioner for the Helmholtz Equation. In Proceedings of the 9th International Symposium on Electric and Magnetic Fields, EMF 2013. Peer reviewed |
Vion, A., Bélanger-Rioux, R., Demanet, L., & Geuzaine, C. (2013). A DDM double sweep preconditioner for the Helmholtz equation with matrix probing of the DtN map. In Proceedings of the 11th International Conference on Mathematical and Numerical Aspects of Waves (WAVES 2013). Peer reviewed |
 | Vion, A., Thierry, B., & Geuzaine, C. (2012). Acceleration of the convergence of a non-overlapping domain decomposition method by an approximate deflation technique for high-frequency wave propagation. Proceedings of the 15th Biennial IEEE Conference on Electromagnetic Field Computation (CEFC2012). Peer reviewed |
Thierry, B., Antoine, X., Boubendir, Y., Geuzaine, C., & Vion, A. (2012). Improved Domain Decomposition Method for the Helmholtz Equation. In Proceedings of the 21th International Conference on Domain Decomposition Methods (DD21). Peer reviewed |
 | Vion, A., Vazquez Sabariego, R., & Geuzaine, C. (2011). A Model Reduction Algorithm for Solving Multiple Scattering Problems Using Iterative Methods. IEEE Transactions on Magnetics, 47 (5), 1470-1473. doi:10.1109/TMAG.2010.2078800 Peer Reviewed verified by ORBi |
 | Geuzaine, C., Vion, A., Gaignaire, R., Dular, P., & V Sabariego, R. (August 2010). An Amplitude Finite Element Formulation for Multiple-Scattering by a Collection of Convex Obstacles. IEEE Transactions on Magnetics, 46 (8), 2963-2966. doi:10.1109/TMAG.2010.2043419 Peer Reviewed verified by ORBi |
 | Vion, A., V Sabariego, R., & Geuzaine, C. (2010). A model reduction algorithm for solving multiple scattering problems using iterative methods. In Proceedings of the 14th Biennial IEEE Conference on Electromagnetic Field Computation (CEFC2010). doi:10.1109/CEFC.2010.5481483 Peer reviewed |
Geuzaine, C., Vion, A., & V Sabariego, R. (2010). Iterative solution of high-frequency multiple-scattering problems using finite elements. In Proceedings of the IVth European Conference on Computational Mechanics (ECCM 2010). Peer reviewed |