Michel Duprez

Publication Activity (10 Years)

Years Active: 2017-2024
Publications (10 Years): 13

Top Topics

Computer Assisted Surgery

Diffuse Optical Tomography

Top Venues

J. Optim. Theory Appl.

SIAM J. Numer. Anal.

Publications

Valentina Scarponi, Michel Duprez, Florent Nageotte, Stéphane Cotin
A zero-shot reinforcement learning strategy for autonomous guidewire navigation. Int. J. Comput. Assist. Radiol. Surg. 19 (6) (2024)
Huu Phuoc Bui, Michel Duprez, Pierre-Yves Rohan, Arnaud Lejeune, Stéphane P. A. Bordas, Marek Bucki, Franz Chouly
Enhancing Biomechanical Simulations Based on A Posteriori Error Estimates: The Potential of Dual Weighted Residual-Driven Adaptive Mesh Refinement. CoRR (2024)
Valentina Scarponi, Michel Duprez, Florent Nageotte, Stéphane Cotin
A Zero-Shot Reinforcement Learning Strategy for Autonomous Guidewire Navigation. CoRR (2024)
Michel Duprez, Vanessa Lleras, Alexei Lozinski, Killian Vuillemot
phi-FEM for the heat equation: optimal convergence on unfitted meshes in space. CoRR (2023)
Michel Duprez, Vanessa Lleras, Alexei Lozinski
Phi-FEM: an optimally convergent and easily implementable immersed boundary method for particulate flows and Stokes equations. CoRR (2022)
Pierre-Alexandre Bliman, Michel Duprez, Yannick Privat, Nicolas Vauchelet
Optimal Immunity Control and Final Size Minimization by Social Distancing for the SIR Epidemic Model. J. Optim. Theory Appl. 189 (2) (2021)
Stephane Cotin, Michel Duprez, Vanessa Lleras, Alexei Lozinski, Killian Vuillemot
φ-FEM: an efficient simulation tool using simple meshes for problems in structure mechanics and heat transfer. CoRR (2021)
Michel Duprez, Alexei Lozinski
φ-FEM: A Finite Element Method on Domains Defined by Level-Sets. SIAM J. Numer. Anal. 58 (2) (2020)
Michel Duprez, Vanessa Lleras, Alexei Lozinski
φ-FEM, a finite element method on domains defined by level-sets: the Neumann boundary case. CoRR (2020)
Michel Duprez, Morgan Morancey, Francesco Rossi
Approximate and Exact Controllability of the Continuity Equation with a Localized Vector Field. SIAM J. Control. Optim. 57 (2) (2019)
Michel Duprez, Morgan Morancey, Francesco Rossi
Minimal time problem for discrete crowd models with a localized vector field. CDC (2018)
Michel Duprez, Stéphane P. A. Bordas, Marek Bucki, Huu Phuoc Bui, Franz Chouly, Vanessa Lleras, Claudio Lobos, Alexei Lozinski, Pierre-Yves Rohan, Satyendra Tomar
Quantifying discretization errors for soft-tissue simulation in computer assisted surgery: a preliminary study. CoRR (2018)
Michel Duprez, Morgan Morancey, Francesco Rossi
Controllability and optimal control of the transport equation with a localized vector field. MED (2017)