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Michel Duprez
ORCID
Publication Activity (10 Years)
Years Active: 2017-2024
Publications (10 Years): 13
Top Topics
Finite Element
Computer Assisted Surgery
Diffuse Optical Tomography
Heat Transfer
Top Venues
CoRR
J. Optim. Theory Appl.
MED
SIAM J. Numer. Anal.
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Publications
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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)