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Raphaël, Pierre - Institut de Mathématiques de Toulouse, Université Paul Sabatier
Existence and stability of a solution blowing up on a sphere supercritical non linear Schrodinger equation
Profiles and Quantization of the Blow Up Mass for critical nonlinear Schrodinger Equation
A NEW VARIATIONAL APPROACH TO THE STABILITY OF GRAVITATIONAL SYSTEMS
Stable self-similar blow up dynamics for the three dimensional relativistic gravitational Vlasov-Poisson system
arXiv:math/0605378v2[math.AP]23Apr2007 Blow up of the critical norm for some radial L2
Sharp Upper Bound on the Blow up Rate for critical nonlinear Schrodinger Equation
Existence and stability of the log-log blow-up dynamics for -critical nonlinear Schrdinger equation in a domain
Two soliton solutions to the three dimensional gravitational Hartree equation
SMOOTH TYPE II BLOW UP SOLUTIONS TO THE FOUR DIMENSIONAL ENERGY CRITICAL WAVE EQUATION
STABLE BLOW UP DYNAMICS FOR THE CRITICAL CO-ROTATIONAL WAVE MAPS AND EQUIVARIANT
ORBITAL STABILITY OF SPHERICAL GALACTIC MODELS MOHAMMED LEMOU, FLORIAN MHATS, AND PIERRE RAPHAL
ON STABILITY OF PSEUDO-CONFORMAL BLOWUP FOR -CRITICAL HARTREE NLS
On one blow up point solutions to the critical nonlinear Schrodinger Equation
On a Sharp lower Bound on Blow up Rate for the L2 non linear Schrodinger Equation
Stability and blow up for the non linear Schrodinger Equation Pierre Raphael
On the blow up phenomenon for the L2 critical non linear
Standing ring blow up solutions to the N-dimensional quintic nonlinear Schrodinger equation
Blow-up Dynamic and Upper Bound on the blow-up Rate for critical nonlinear Schrodinger Equation
Sur la dynamique des solitons : stabilite, collision et explosion Yvan Martel(1)
EXISTENCE AND UNIQUENESS OF MINIMAL BLOW UP SOLUTIONS TO AN INHOMOGENEOUS MASS CRITICAL NLS
STABLE SELF SIMILAR BLOW UP DYNAMICS FOR SLIGHTLY L2 SUPERCRITICAL NLS EQUATIONS
ANALYSE NON LINAIRE Sur la stabilit des ondes solitaires
Pierre Raphael Universite Paul Sabatier et Institut Universitaire de France
STABLE BLOW UP DYNAMICS FOR THE 1-COROTATIONAL ENERGY CRITICAL HARMONIC HEAT FLOW
BLOW UP DYNAMICS FOR SMOOTH DATA EQUIVARIANT SOLUTIONS TO THE CRITICAL SCHRDINGER MAP
Seminaire BOURBAKI Novembre 2011 64`eme annee, 2011-2012, no 1046
