Laurençot, Philippe.
Laurençot, Philippe, 19..-....
![Sudoc [ABES], France](/viaf/images/flags/SUDOC.png "Sudoc [ABES], France")
Philippe Laurençot
VIAF ID: 100852921 (Personal)
Permalink: http://viaf.org/viaf/100852921
Preferred Forms
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100 1 _
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Laurencot, Philippe
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100 1 _
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Laurençot, Philippe
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100 1 _ ‡a Laurençot, Philippe
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100 1 _
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Laurençot, Philippe,
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19..-....
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100 1 _
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Laurenc̨ot, Philippe
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100 1 _ ‡a Laurençot, Philippe
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100 1 _ ‡a Laurençot, Philippe
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100 1 _ ‡a Laurençot, Philippe.
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100 0 _
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Philippe Laurençot
4xx's: Alternate Name Forms (2)
5xx's: Related Names (3)
- 510 2 _
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Centre national de la recherche scientifique
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affi
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https://d-nb.info/standards/elementset/gnd#affiliation
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Affiliation
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Institut de Mathématiques de Toulouse
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affi
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https://d-nb.info/standards/elementset/gnd#affiliation
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Affiliation
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Toulouse
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ortw
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https://d-nb.info/standards/elementset/gnd#placeOfActivity
Works
| Title | Sources |
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| The 8π-problem for radially symmetric solutions of a chemotaxis model in a disc |
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| Analytic methods for coagulation-fragmentation models. |
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| Basic properties of solutions |
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| The Becker-Döring model with diffusion. |
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| Energy minimizers for an asymptotic MEMS model with heterogeneous dielectric properties |
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| Equations aux dérivées partielles et systèmes dynamiquesappliqués à des problèmes issus de la physique et de la biologie |
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| Etude mathématique de quelques modèles issus de la théorie cinétique |
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| Étude qualitative de trois problèmes paraboliques non-linéaires |
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| Fragmentation-diffusion model : existence of solutions and asymptotic behaviour |
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| Fragmentation-diffusion model / Philippe Laurençot, Dariusz Wrzosek. - Warsaw, 1996. |
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| Limite de diffusion de l'équation de Fokker-Planck avec un équilibre à décroissance lente : modèles d'agrégation en dynamique de populations |
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| Mathematical study of some model derived from kinetic theory. |
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| Modélisation et simulation numérique de la vitesse de propagation d'une piqûre de corrosion |
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| Non-existence of nonnegative separate variable solutions to a porous medium equation with spatially dependent nonlinear source |
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| Nonlinear parabolic equations for hydrogeology and phase transition problems. |
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| ON SOME NONLINEAR PARTIAL DIFFERENTIAL PROBLEMS. |
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| Partial differential equations and dynamical systems applied to problems coming from physics and biology. |
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| Partial differential equations of Keller-Segel type in population dynamics and of Fokker-Planck type in neurosciences. |
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| Qualitative study of a parabolic-elliptic Keller-Segel system and of noncooperative elliptic systems. |
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| Sharp Sobolev Estimates for Concentration of Solutions to an Aggregation–Diffusion Equation |
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| Stabilité d'ondes périodiques, schéma numérique pour le chimiotactisme |
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| Stability of periodic waves, numerical scheme for chemiotaxis. |
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| Study of the Keller-Segel model in both stochastic and determinist cases. |
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| Topics in mathematical modeling |
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| Trace initiale des solutions d'équations hamilton-jacobi avec termes d'absorption |
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| The Young inequality and the δ2-condition |
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