Afficher la pageAnciennes révisionsLiens de retourHaut de page Cette page est en lecture seule. Vous pouvez afficher le texte source, mais ne pourrez pas le modifier. Contactez votre administrateur si vous pensez qu'il s'agit d'une erreur. ==== Publications ==== === Books === - <color #7092be>**F. Hubert**, J. Hubbard</color> <color #ff7f27>//CALCUL SCIENTIFIQUE - De la théorie à la pratique - Illustrations avec Maple et Matlab. Volume 1 : Equations algébriques, traitement du signal, géométrie effective//</color>, Vuibert, 2006. 432 pages. {{ :fr:book1.jpeg?100 |}} - <color #7092be>**F. Hubert**, J. Hubbard</color> <color #ff7f27>//CALCUL SCIENTIFIQUE - De la théorie à la pratique - Illustrations avec Maple et Matlab. Volume 2 : Equations différentielles ordinaires, équations aux dérivées partielles//</color>, Vuibert, 2006. 288 pages {{ :fr:book2.jpeg?100 |}} ---- === Articles === - <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>. A paraître dans Mathematical Modelling of Natural Phenomena (MMNP), 2020. - <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>A. Barlukova, D. White, G. Henry, S. Honoré, **F. Hubert**</color> <color #ff7f27>//Mathematical modeling of microtubule dynamic instability: new insight into the link between GTP-hydrolysis and microtubule aging//</color>, M2AN, 52, p. 2433–2456, 2018. - <color #7092be>A. Barlukova, S. Honoré, **F. Hubert**</color> <color #ff7f27>//Mathematical Modeling of Effect Of Microtubule-Targeted Agents On Microtubule Dynamic Instability//</color>, ESAIM Proc, 62, p. 1-16, 2018. - <color #7092be>D. Figarella-Branger, et al.</color> //Duplications of KIAA1549 and BRAF screening by Droplet Digital PCR from formalin-fixed paraffin-embedded DNA is an accurate alternative for KIAA1549-BRAF fusion detection in pilocytic astrocytomas//, Modern Pathology, 31(10) , p.1490-1501, 2018. - <color #7092be>D. White , S. Honoré, **F. Hubert**</color> <color #ff7f27>//A new mathematical model for microtubule dynamic instability: exploring the effect of end-binding proteins and microtubule targeting chemotherapy drugs//</color>, Journal Theoritical Biology, 429, p. 18-34, 2017. - <color #7092be>N. Hartung, C. Huynh, C. Gaudy-Marqueste, A. Flavian, N. Malissen, MA Richard-Lallemand, **F. Hubert**, JJ Grob</color> <color #ff7f27>//Study of metastatic kinetics in metastatic melanoma treated with B-RAF inhibitors: Introducing mathematical modelling of kinetics into the therapeutic decision//</color>, PLOS One, 12(5) 2017. - <color #7092be>**F. Hubert**, M. Jedouaa, I. Khames, J. Olivier, O. Theodoly, A. Trescases</color> <color #ff7f27>// Cell Motility in confinement : a computaional model for the shape of the cell//</color>, ESAIM Proc. And Survey, 55, p. 148-166, déc 2016. - <color #7092be>S. Honoré, **F. Hubert**</color> <color #ff7f27>// L'adhésion thérapeutique : un nouveau challenge pour les mathématiques,//</color> A3 Magazine - Rayonnement du CNRS, juillet 2016. - <color #7092be>N. Hartung, S. Mollard, D. Barbolosi, A. Benabdallah, G. Chapuisat, G. Henry,S. Giacometti, A. Iliadis, J.Ciccolini, C. Faivre, **F. Hubert**</color> <color #ff7f27>// Mathematical Modeling of tumor growth and metastatics spreading : validation in tumor-bearing mice,//</color> Cancer Research 74, p. 6397-6407, 2014. - <color #7092be>L. Halpern, **F. Hubert**</color> <color #ff7f27>// A new nite volume Schwarz algorithm for advection-diusion equations,//</color> SIAM Journal of Numerical Analysis, 52(3), 2014. - <color #7092be>D. Barbolosi, A. Benabdallah, S. Benzekry, J. Ciccolini, C. Faivre, **F. Hubert**, F. Verga et B. You</color> <color #ff7f27>// A mathematical model for growing metastases on oncologist's service,//</color> Computational Surgery and dual training, p. 331-338, 2014. - <color #7092be>B. Andreianov, M. Bendahname, **F. Hubert** </color> <color #ff7f27>//On 3D DDFV discretization of gradient and divergence operators. II. Discrete functional analysis tools and applications to degenerate parabolic problems,//</color> Computational Methods in applied Mathematics, 13(4), p. 369-410, 2013. - <color #7092be>N. André, D. Barbolosi, F. Billy, G. Chapuisat, E. Grenier, **F. Hubert**, A. Rovini </color> <color #ff7f27>// Mathematical model of tumor growth controlled by metronomic chemotherapies,//</color> ESAIM Proceedings, 41, p. 77-94, 2013. - <color #7092be>S. Benzekry, G. Chapuisat, J. Ciccolini , A. Erlinger, **F. Hubert** </color> <color #ff7f27>// A new mathematical model for optimizing the combination between antiangiogenic and cytotoxic drugs in oncology,//</color> CRAS, 350, p. 23-28, 2012. - <color #7092be>S. Benzekry, N. André, A. Benabdallah, J. Ciccolini, C. Faivre, **F. Hubert**, D. Barbolosi </color> <color #ff7f27>// Modelling the impact of anticancer agents on metastatic spreading,//</color> Mathematical Modelling of Natural Phenomena, 7(1), 306-336, 2012. - <color #7092be>B. Andreianov, M. Bendahname, **F. Hubert**, S. Krell</color> <color #ff7f27>// On 3D DDFV discretization of gradient and divergence operators. I. Meshing, operators and discrete duality.,//</color> IMA JNA, 32(4), 15741603, 2012. - <color #7092be>Y. Coudière, **F. Hubert**</color> <color #ff7f27>// A 3D Discrete Duality Finite Volume Method for Nonlinear Elliptic Equations,//</color> SIAM Journal of Scientic Computing, 33(4), 1739-1764, 2011. - <color #7092be>F. Verga, B. You, A. Benabdallah, C. Faivre, C. Mercier, C. Ciccolini, **F. Hubert**, D. Barbolosi </color> <color #ff7f27>//Modélisation du risque d'evolution metastatique chez les patients supposés avoir une maladie localisée, //</color>Oncologie, 13(8), 528-533, 2011. - <color #7092be>F. Boyer, **F. Hubert**, J. Le Rousseau </color> <color #ff7f27>//Uniform null-controllability for space/time-discretized parabolic equations,//</color> Nümerische Math. 118(4), 601-660, 2011. - <color #7092be>C. Pocci, A. Moussa, G. Chapuisat, **F. Hubert** </color> <color #ff7f27>//Numerical study of the stopping of aura during migraine,//</color> ESAIM : proceedings, 30, 44-52, 2010. - <color #7092be>F. Boyer, **F. Hubert**, J. Le Rousseau </color> <color #ff7f27>// Discrete Carleman estimates for elliptic operators in arbitrary dimension and applications,//</color> SIAM J. on Control and Optimization, 48(8), 5357-5397, 2010. - <color #7092be>F. Boyer, **F. Hubert**, J. Le Rousseau </color> <color #ff7f27>//Discrete Carleman estimates for elliptic operators and uniform controllability of semi-discretized parabolic equations, //</color>Journal de Mathematiques Pures et Appliquees, 93(3), 240-273, 2010. - <color #7092be>**F. Hubert**, M.-C. Viallon </color> <color #ff7f27>//Algorithm to refine a finite volume mesh admissible for parabolic problems,//</color> CRAS Mécanique, 337, 95-100, 2009. - <color #7092be>F. Boyer, **F. Hubert**, S. Krell </color> <color #ff7f27>//A Schwarz algorithm for the Discrete Duality Finite Volume (DDFV) scheme,//</color> IMA Jour. Num. Anal., 30, 1062-1100, 2009. - <color #7092be>D. Barbolosi, A. Benabdallah, **F. Hubert**, F. Verga </color> <color #ff7f27>//Mathematical and numerical analysis for a model of growing metastatic tumors,//</color> Mathematical Biosciences, 218(1), 1-14, 2009. - <color #7092be>P. Angot, F. Boyer, **F. Hubert** </color> <color #ff7f27>//Asymptotic and numerical modelling of flows in fractured porous media,//</color> M2AN, 23, 239-275, 2009. - <color #7092be>F. Boyer, **F. Hubert** </color> <color #ff7f27>//Finite volume method for 2D linear and nonlinear elliptic problems with discontinuities,//</color> SIAM Journal of Numerical Analysis, Vol. 46, No 6, pp 3032-3070, 2008. - <color #7092be>B. Andreianov, F. Boyer, **F. Hubert** </color> <color #ff7f27>//Discrete duality finite volume schemes for Leray-Lions type problems on general 2D meshes,//</color> Numerical Methods for PDE, Vol. 23, 1, pp 145-195, 2007. - <color #7092be>B. Andreianov, F. Boyer, **F. Hubert** </color> <color #ff7f27>//Discrete Besov framework for finite volume approximation of the p-laplacian on non uniform cartesian grids,//</color> ESAIM Proceedings, Vol. 18, pp 1-10, 2007. - <color #7092be>B. Andreianov, F. Boyer, **F. Hubert** </color> <color #ff7f27>//On finite volume approximation of regular solutions of the p-laplacian,//</color> IMA Journal Numerical Analysis, Vol. 26, 3, pp. 472-502, 2006. - <color #7092be>B. Andreianov, F. Boyer, **F. Hubert** </color> <color #ff7f27>//Besov regularity and new error estimates for nite volume approximations of the p-laplacian,//</color> Num. Math, Vol. 100, 4, pp. 565-592, 2005. - <color #7092be>B. Andreianov, F. Boyer, **F. Hubert** </color> <color #ff7f27>//Finite volume schemes for the p-laplacian, on cartesian meshes,//</color> M2AN, Vol. 38,6, pp. 931-960, 2004. - <color #7092be>R. Cautrès, R. Herbin, **F. Hubert** </color> <color #ff7f27>//The Lions domain decomposition algorithm on non matching cell-centered nite volume meshes,//</color> IMA Journal Numerical Analysis, Vol. 24, pp. 465-490, 2004. - <color #7092be>T. Gallouët, **F. Hubert** </color> <color #ff7f27>//On the convergence of the parabolic approximation of a conservation law in several space dimensions, //</color>Chinese Annals of Mathematics, Vol. 20B, No 1, pp 7-10, 1999. - <color #7092be>**F. Hubert** </color> <color #ff7f27>//Global existence for hyperbolic-parabolic systems with large periodic initial data,//</color> Differential and Integral Equations, Vol. 11, No 1, pp 69-83, 1998. - <color #7092be>**F. Hubert** </color> <color #ff7f27>//Viscous perturbations of isometric solutions of the Keytz-Kranzer system,//</color> Applied Mathematics Letters, Vol. 10, No 1, pp 51-55, 1997. - <color #7092be>**F. Hubert**, D. Serre </color> <color #ff7f27>//Dynamique lente-rapide pour des perturbations de systemes de lois de conservation,//</color> Comptes Rendus de l'Academie des Sciences. Vol. 322, Serie I, pp 231-236, 1996. - <color #7092be>**F. Hubert**, D. Serre </color> <color #ff7f27>//Fast-slow dynamics for parabolic perturbations of conservation laws, //</color>Communications in Partial Differential Equations, Vol 21, No 9-10, pp 1587-1608, 1996. ---- === Proceedings === - <color #7092be>M. Gander, L. Halpern, **F. Hubert**, S. Krell</color> <color #ff7f27>// Optimized Schwarz Methods for Anisotropic Diffusion with Discrete Duality Finite Volume Discretizations, //</color>FVCA9, Bergen, Juin 2020. - <color #7092be>**F. Hubert**, R. Tesson</color> <color #ff7f27>// Weno scheme for transport equation on unstructured grids with a DDFV approach,//</color> FVCA8, Lille, Juin 2017. - <color #7092be>A. Barlukova, S. Honoré, **F. Hubert** </color> <color #ff7f27>//Mathematical modeling of the microtubule dynamic instability: a new approch of GTP-tubulin hydrolysis,//</color> ITM Web of Conferences 5, 00011 (2015). - <color #7092be>N. Hartung, **F. Hubert** </color> <color #ff7f27>//An efficient implementation of a 3D CeVeFE DDFV scheme on cartesian meshes and an application in image processing,//</color> FVCA7, Berlin, Juin 2014. - <color #7092be>M. Gander, L. Halpern, **F. Hubert**, S. Krell </color> <color #ff7f27>//DDFV Schwarz Ventcell algorithms ,//</color> 22st International Conference on Domain Decomposition, Lugano, Switzerland, Septembre 2013. - <color #7092be>L. Halpern, **F. Hubert** </color> <color #ff7f27>//A new finite volume Schwarz algorithm for advection-diffusion equations, //</color>21st International Conference on Domain Decomposition, Rennes, Juin 2012. - <color #7092be>M. Gander, **F. Hubert**, S. Krell </color> <color #ff7f27>//Optimized Schwarz algorithms in the framework of DDFV schemes,//</color> 21st International Conference on Domain Decomposition, Rennes, Juin 2012. - <color #7092be>R. Eymard, G. Henry, R. Herbin, **F. Hubert**, R. Klöfkorn, G. Manzini </color> <color #ff7f27>//3D Benchmark on Discretization Schemes for Anisotropic Diffusion Problems on General Grids,//</color> FVCA6, Prague, Juin 2011. - <color #7092be>Y. Coudière, **F. Hubert**, G. Manzini </color> <color #ff7f27>//A CeVeFE DDFV scheme for discontinuous anisotropic permeability tensors,//</color> FVCA6, Prague, Juin 2011. - <color #7092be>Y. Coudière, **F. Hubert**, G. Manzini</color> <color #ff7f27>// Benchmark 3D : CeVeFE-DDFV, a discrete duality scheme with cell/vertex/face+edge unknown,//</color> FVCA6, Prague, Juin 2011. - <color #7092be>B. Andreianov, **F . Hubert**, S. Krell</color> <color #ff7f27>// Benchmark 3D : a version of the DDFV scheme with cell/vertex unknowns on general meshes,//</color> FVCA6, Prague, Juin 2011. - <color #7092be>Y. Coudière, **F. Hubert** </color> <color #ff7f27>//A 3D Discrete Duality Finite Volume Method for Nonlinear Elliptic Equations,//</color> ALGORITMY, Podanske, Slovaquie, pp. 51-60, Mars 2009. - <color #7092be>F. Boyer, **F. Hubert**, J. Le Rousseau</color> <color #ff7f27>// On the approximation of the null-controllability problem for parabolic equations,//</color> ALGORITMY, Podanske, Slovaquie, pp. 101-110, Mars 2009. - <color #7092be>R. Herbin, **F. Hubert**</color> <color #ff7f27>// Benchmark on discretization schemes for anisotropic diffusion problems on general grids,//</color> Proceedings of the 5th international symposium on Finite Volumes for Complex Applications, Aussois, Juin 2008. - <color #7092be>F. Boyer, **F. Hubert** </color> <color #ff7f27>//Benchmark for Anisotropic Problems.The DDFV "discrete duality finite volumes" and m-DDFV schemes,//</color> Proceedings of the 5th international symposium on Finite Volumes for Complex Applications, Aussois, Juin 2008. - <color #7092be>F. Boyer, **F. Hubert**, S. Krell </color> <color #ff7f27>//Non-overlapping Schwarz algorithm for DDFV schemes on general 2D meshes,//</color> Proceedings of the 5th international symposium on Finite Volumes for Complex Applications, Aussois, Juin 2008. - <color #7092be>F. Boyer, **F. Hubert**</color> <color #ff7f27>// The m-DDFV Method for Heterogeneous Linear and Nonlinear Elliptic Problems,//</color> Proceedings of the 5th international symposium on Finite Volumes for Complex Applications, Aussois, Juin 2008.