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Zaag, Hatem - Laboratoire d'Analyse, Géométrie et Applications, Institut Galilée, Université Paris 13 Nord
Openness of the set of non characteristic points and regularity of the blow-up curve for the 1 D
Blow-up results for vector-valued nonlinear heat equations with no gradient structure
A Liouville theorem and blow-up behavior for a vector-valued nonlinear heat equation with no
Isolatedness of characteristic points at blow-up for a semilinear wave equation in one space
--LATEXprosper--Introduction and results on blow-up for the semilinear wave
A Liouville Theorem for Vector-valued Nonlinear Heat Equations and
Boundedness till blow-up of the difference between two solutions to a semilinear
Regularity of the blow-up set for the semilinear heat CNRS Ecole Normale Superieure
Stability of the blow-up profile of non-linear heat equations from the
--LATEXprosper--Non characteristic points for the semilinear wave equation
Determination of the blow-up rate for a critical semilinear wave equation
On characteristic points at blow-up for a semilinear wave equation in one space dimension
Existence and universality of the blow-up profile for the semilinear wave equation in one space
a priori estimates for some chemotaxis models and applications to the Cauchy problem
On growth rate near the blow-up surface for semilinear wave equations
Global Solutions of some Chemotaxis and Angiogenesis Systems in high space dimensions
On the regularity of the blow-up set for semilinear heat equations
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O.D.E. type behavior of blow-up solutions of nonlinear heat equations
Refined uniform estimates at blow-up and applications for nonlinear heat equations
Reconnection of vortex with the boundary and finite time Quenching
Synth`ese de travaux scientifiques en vue de l'obtention de
--LATEXprosper--Isolatedness of characteristic points for blow-up solutions
Points caractristiques l'explosion pour une quation semilinaire des ondes
Regularity of the blow-up set for the semilinear heat April 26, 2004
Stability of blow-up profile for equation of the type ut = u + |u|p-1
Case = 0, (N -2)p < N + 2 Proof of the Liouville theorem case = 0
ON THE DEPENDENCE OF THE BLOW-UP TIME WITH RESPECT TO THE INITIAL DATA IN A
A Liouville theorem for vector valued semilinear heat equations with no gradient structure and
--LATEXprosper--Characteristic points for the semilinear wave equation
Blow-up profile for the Complex Ginzburg-Landau equation
Construction and stability of a blow up solution for a nonlinear heat equation with a gradient term
Continuity of the blow-up profile with respect to initial data and to the blow-up point for a semilinear
Equations aux derivees partielles/Partial Differential Equations Stabilite du profil `a l'explosion pour
--LATEXprosper--Isolatedness of characteristic points for blow-up solutions
Optimal estimates for blow-up rate and behavior for nonlinear heat equations
Determination of the curvature of the blow-up set and refined singular behavior for a semilinear
Estimations uniformes `a l'explosion pour les equations de la chaleur non lineaires et
Regularity for two models of chemotaxis and angiogenesis
--LATEXprosper--Isolatedness of characteristic points for blow-up solutions
Similarities in blow-up approaches between semilinear heat and wave CNRS UMR 8553 Ecole Normale Superieure