Publications and communications of Eric Béchet

Bolyn, A., & Béchet, E. (2023). Digital twin for tool wear monitoring and compensation in turning.

Bolyn, A., & Béchet, E. (2023). Identifying a problem and solving it with a digital twin idea.

Royer, A., Geuzaine, C., Béchet, E., & Modave, A. (15 May 2022). A non-overlapping domain decomposition method with perfectly matched layer transmission conditions for the Helmholtz equation. Computer Methods in Applied Mechanics and Engineering, 395, 115006. doi:10.1016/j.cma.2022.115006

Leblanc, C., Kilingar, N. G., Jung, A., Kamel, K. E. M., Massart, T. J., Noels, L., & Béchet, E. (09 May 2022). Analysis of an open foam generated from computerized tomography scans of physical foam samples. International Journal for Numerical Methods in Engineering, 123, 4267-4295. doi:10.1002/nme.7008

Haler, J., Béchet, E., Kune, C., Far, J., & De Pauw, E. (02 February 2022). Geometric Analysis of Shapes in Ion Mobility-Mass Spectrometry. Journal of the American Society for Mass Spectrometry, 33 (2), 273-283. doi:10.1021/jasms.1c00266

Royer, A., Béchet, E., & Geuzaine, C. (2021). Gmsh-Fem: An Efficient Finite Element Library Based On Gmsh. In 14th World Congress on Computational Mechanics (WCCM), ECCOMAS Congress 2020. Scipedia. doi:10.23967/wccm-eccomas.2020.161

Duboeuf, F., & Béchet, E. (2017). Embedded solids of any dimension in the X-FEM. Part II - Imposing Dirichlet boundary conditions. Finite Elements in Analysis and Design. doi:10.1016/j.finel.2017.01.005

Duboeuf, F., & Béchet, E. (2017). Embedded solids of any dimension in the X-FEM. Part I - Building a dedicated P1 function space. Finite Elements in Analysis and Design. doi:10.1016/j.finel.2016.12.001

Asadi Kalameh, H., Pierard, O., Friebel, C., & Béchet, E. (15 September 2016). Semi-implicit representation of sharp features with level sets. Finite Elements in Analysis and Design, 117-118, 31-45. doi:10.1016/j.finel.2016.04.004

Pierard, O., Jin, Y., Wyart, E., Dompierre, B., & Béchet, E. (01 June 2016). Simulation of contact on crack lips and its influence on fatigue life prediction [Paper presentation]. 11th International Conference on Multiaxial Fatigue & Fracture (ICMFF11), Sevilla, Spain.

Jin, Y., Pierard, O., Wyard, E., & Béchet, E. (2016). Crack Lip Contact Modeling Based on Lagrangian Multipliers with X-FEM. In E. Benvenuti & G. Ventura (Ed.), Advances in Discretization Methods (SEMA SIMAI Springer Series, pp. 123-142). Springer. doi:10.1007/978-3-319-41246-7_6

Wan, F., Tran, M. P., Leblanc, C., Béchet, E., Plougonven, E., Léonard, A., Detrembleur, C., Noels, L., Thomassin, J.-M., & Nguyen, V. D. (December 2015). Experimental and computational micro–mechanical investigations of compressive properties of polypropylene/multi–walled carbon nanotubes nanocomposite foams. Mechanics of Materials, 91 (Part 1), 95-118. doi:10.1016/j.mechmat.2015.07.004

Asadi Kalameh, H., Pierard, O., & Béchet, E. (July 2015). Exact Representation of Interfaces Using Enriched Level-Set Technique [Paper presentation]. 13th U.S. National Congress on Computational Mechanics (USNCCM13).

Duboeuf, F., & Béchet, E. (2015). Simulations numériques sur des solides plongés, dans un contexte X-FEM. In Actes du 11ème colloque national en calcul des structures.

Asadi Kalameh, H., Pierard, O., & Béchet, E. (July 2014). IMPLICIT REPRESENTATION OF BOUNDARIES USING LEVEL-SETS FOR TRANSIENT MACHINING APPLICATION [Paper presentation]. 11th. World Congress on Computational Mechanics.

Mouton, T., & Béchet, E. (2014). Vorosweep: a fast generalized crystal growing Voronoi diagram generation algorithm. ORBi-University of Liège. https://orbi.uliege.be/handle/2268/172579.

Remacle, J.-F., Henrotte, F., Carrier-Baudouin, T., Béchet, E., Marchandise, E., Geuzaine, C., & Mouton, T. (2013). A Frontal Delaunay Quad Mesh Generator Using the L ∞  Norm. International Journal for Numerical Methods in Engineering, 94 (5), 494-512. doi:10.1002/nme.4458

Nguyen, V. D., Béchet, E., Geuzaine, C., & Noels, L. (April 2012). Imposing periodic boundary condition on arbitrary meshes by polynomial interpolation. Computational Materials Science, 55, 390-406. doi:10.1016/j.commatsci.2011.10.017

Mouton, T., & Béchet, E. (2012). Lloyd relaxation using analytical Voronoi diagram in the L_infinite norm and its application to quad optimization. In X. Jiao (Ed.), Proceedings of the 21st International Meshing Roundtable.

Duboeuf, F., & Béchet, E. (16 November 2011). The extended finite element method for three-dimensional reinforced composites [Paper presentation]. Fifth International Conference on Advanced COmputational Methods in ENgineering (ACOMEN 2011), Liège, Belgium.

Nguyen, V. D., Béchet, E., Geuzaine, C., & Noels, L. (2011). Imposing periodic boundary condition on arbitrary meshes by polynomial interpolation. In M. Hogge, R. Van Keer, E. Dick, B. Malengier, M. Slodicka, E. Béchet, C. Geuzaine, L. Noels, ... J.-F. Remacle (Eds.), Proceedings of the 5th International Conference on Advanded COmputational Methods in Engineering (ACOMEN2011) (pp. 9).

Béchet, E., Scherzer, M., & Kuna, M. (2006). Application of the X-FEM to the fracture of piezoelectric materials [Paper presentation]. 7th WCCM, Los Angeles, United States.