Les deux révisions précédentes Révision précédente | Prochaine révisionLes deux révisions suivantes |
fr:recherche [2021/09/23 12:40] – fhubert | fr:recherche [2021/09/23 12:41] – fhubert |
---|
=== Articles dans des revues avec comité de lecture === | === Articles dans des revues avec comité de lecture === |
- <color #7092be>M. Gander, L. Halpern, **F. Hubert**, S. Krell</color> <color #ff7f27>//Discrete Optimization of Robin Transmission Conditions for Anisotropic Diffusion with Discrete Duality Finite Volume Methods //</color> Vietnam J. Math. (2021). https://doi.org/10.1007/s10013-021-00518-3 | - <color #7092be>M. Gander, L. Halpern, **F. Hubert**, S. Krell</color> <color #ff7f27>//Discrete Optimization of Robin Transmission Conditions for Anisotropic Diffusion with Discrete Duality Finite Volume Methods //</color> Vietnam J. Math. (2021). https://doi.org/10.1007/s10013-021-00518-3 |
- <color #7092be>M. Gander, L. Halpern, **F. Hubert**, S. Krell</color> <color #ff7f27>//Optimized Schwarz methods with general Ventcell transmission conditions for fully anisotropic diffusion with discrete duality finite volume discretizations //</color> Moroccan Journal of Pure and Applied Analysis, 7(2), p. 182-213, 2021. Published online https://content.sciendo.com/view/journals/mjpaa/mjpaa-overview.xml?language=en&tab_body=latestIssueToc-79907 | - <color #7092be>M. Gander, L. Halpern, **F. Hubert**, S. Krell</color> <color #ff7f27>//Optimized Schwarz methods with general Ventcell transmission conditions for fully anisotropic diffusion with discrete duality finite volume discretizations //</color> Moroccan Journal of Pure and Applied Analysis, 7(2), p. 182-213, 2021. Published online https://content.sciendo.com/view/journals/mjpaa/mjpaa-overview.xml?language=en&tab_body=latestIssueToc-79907 |
- <color #7092be>E. Denicolai, S. Honoré, **F. Hubert**, R. Tesson</color> <color #ff7f27>//Microtubules (MT) a key target in oncology : Mathematical modeling of anti-MT agents on cell migration//</color>. Mathematical Modelling of Natural Phenomena, Cancer modelling, 15, 2020. Published online https://www.mmnp-journal.org/articles/mmnp/abs/2020/01/mmnp190010/mmnp190010.html | - <color #7092be>E. Denicolai, S. Honoré, **F. Hubert**, R. Tesson</color> <color #ff7f27>//Microtubules (MT) a key target in oncology : Mathematical modeling of anti-MT agents on cell migration//</color>. Mathematical Modelling of Natural Phenomena, Cancer modelling, 15, 2020. Published online https://www.mmnp-journal.org/articles/mmnp/abs/2020/01/mmnp190010/mmnp190010.html |
- <color #7092be>S. Honoré, **F. Hubert**, M. Tournus, D. White</color> <color #ff7f27>//A growth-fragmentation approach for modeling microtubule dynamic instability//</color>, Bulletin of Mathematical Biology, 81 p. 722–758 (2019). | - <color #7092be>S. Honoré, **F. Hubert**, M. Tournus, D. White</color> <color #ff7f27>//A growth-fragmentation approach for modeling microtubule dynamic instability//</color>, Bulletin of Mathematical Biology, 81 p. 722–758 (2019). |