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Krieger, Joachim - Department of Mathematics, University of Pennsylvania
JOURNAL OF THE AMERICAN MATHEMATICAL SOCIETY
NULL-FORM ESTIMATES AND NONLINEAR WAVES JOACHIM KRIEGER
ON THE FOCUSING CRITICAL SEMI-LINEAR WAVE EQUATION J. KRIEGER, W. SCHLAG
CONCENTRATION COMPACTNESS FOR CRITICAL WAVE MAPS JOACHIM KRIEGER, WILHELM SCHLAG
CURRICULUM VITAE JOACHIM KRIEGER
arXiv:submit/0141494[math.AP]8Nov2010 GLOBAL DYNAMICS ABOVE THE GROUND STATE ENERGY
ON STABILITY OF PSEUDO-CONFORMAL BLOWUP FOR -CRITICAL HARTREE NLS
SLOW BLOW UP SOLUTIONS FOR CERTAIN CRITICAL WAVE EQUATIONS. 1. Introduction
LARGE TIME DECAY AND SCATTERING FOR WAVE MAPS. J. KRIEGER AND K. NAKANISHI
GLOBAL REGULARITY AND SINGULARITY DEVELOPMENT FOR WAVE MAPS
SLOW BLOW-UP SOLUTIONS FOR THE H1 FOCUSING SEMI-LINEAR WAVE EQUATION
RENORMALIZATION AND BLOW UP FOR CHARGE ONE EQUIVARIANT CRITICAL WAVE MAPS.
NON-GENERIC BLOW-UP SOLUTIONS FOR THE CRITICAL FOCUSING NLS IN J. KRIEGER, W. SCHLAG
GLOBAL REGULARITY FOR THE YANGMILLS EQUATIONS ON HIGH DIMENSIONAL MINKOWSKI SPACE
GLOBAL REGULARITY OF WAVE MAPS FROM R2+1 SMALL ENERGY
GLOBAL DYNAMICS AWAY FROM THE GROUND STATE FOR THE ENERGY-CRITICAL NONLINEAR WAVE EQUATION
STABILITY OF SPHERICALLY SYMMETRIC WAVE MAPS. Abstract. We study Wave Maps from R2+1 to the hyperbolic plane H2 with
RENORMALIZATION AND BLOW UP FOR THE CRITICAL YANG-MILLS PROBLEM.
GLOBAL SOLUTIONS TO A NON-LOCAL DIFFUSION EQUATION WITH QUADRATIC NON-LINEARITY
COURS 'EQUATIONS ORDINAIRES DIFFERENTIELLES', EPFL AUTOMNE 2010 lundi 14.15 -16.00
GLOBAL REGULARITY OF WAVE MAPS FROM R3+1 JOACHIM KRIEGER
Two soliton solutions to the three dimensional gravitational Hartree equation
'EQUATIONS ORDINAIRES DIFFERENTIELLES', SERIE 6 A retourner lundi prochain avant la classe a Joules Nahas.
