Abstract
In this paper we consider global and non-global bounded radial solutions of the focusing energy-critical wave equation in space dimension 3. We show that any of these solutions decouples, along a sequence of times that goes to the maximal time of existence, as a sum of modulated stationary solutions, a free radiation term and a term going to 0 in the energy space. In the case where there is only one stationary profile, we show that this expansion holds asymptotically without restriction to a subsequence.
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References
S. Alinhac. Blowup for nonlinear hyperbolic equations. In: Progress in Nonlinear Differential Equations and their Applications, Vol. 17. Birkhäuser Boston Inc., Boston (1995).
Aubin T.: Équations différentielles non linéaires et problème de Yamabe concernant la courbure scalaire. Journal of Pure and Applied Mathematics (9, (3) 55, 269–296 (1976)
Bahouri H., Gérard P.: High frequency approximation of solutions to critical nonlinear wave equations. American Journal of Mathematics (1) 121, 131–175 (1999)
Brezis H., Coron J.: Convergence of solutions of H-systems or how to blow bubbles. Archive for Rational Mechanics and Analysis 89, 21–56 (1985)
Christodoulou D., Shadi Tahvildar-Zadeh A.: On the asymptotic behavior of spherically symmetric wave maps. Duke Mathematical Journal 71, 31–69 (1993)
Duyckaerts T., Kenig C., Merle F.: Universality of blow-up profile for small radial type II blow-up solutions of energy-critical wave equation. Journal of the European Mathematical Society (3) 3, 533–599 (2011)
T. Duyckaerts, C. Kenig and F. Merle. Universality of the blow-up profile for small type II blow-up solutions of the energy-critical wave equation: the non-radial case. Journal of the European Mathematical Society(to appear) (2010).
T. Duyckaerts and F. Merle. Dynamics of threshold solutions for energy-critical wave equation. International Mathematics Research Papers IMRP,67 (2008), Art ID rpn002.
W. Eckhaus and P. Schuur. The emergence of solitons of the Korteweg-de Vries equation from arbitrary initial conditions. Mathematical Methods in the Applied Sciences, (1)5 (1983), 97–116.
W. Eckhaus. The long-time behaviour for perturbed wave-equations and related problems. In: Trends in Applications of Pure Mathematics to Mechanics (Bad Honnef, 1985), Lecture Notes in Physics,Vol. 249. Springer, Berlin (1986), pp. 168–194.
C.E. Kenig and F. Merle. Global well-posedness, scattering and blow-up for the energy-critical, focusing, non-linear Schrödinger equation in the radial case. Invented Mathematics,(3)166 (2006), 645–675.
Kenig C.E., Merle F.: Global well-posedness, scattering and blow-up for the energy-critical focusing non-linear wave equation. Acta Mathematica (2) 201, 147–212 (2008)
J. Krieger, K. Nakanishi and W. Schlag. Global dynamics away from the ground state for the energy-critical nonlinear wave equation (2010). ArXiv e-prints.
Krieger J., Schlag W.: On the focusing critical semi-linear wave equation. American Journal of Mathematics (3) 129, 843–913 (2007)
Krieger J., Schlag W., Tataru D. (2009) Slow blow-up solutions for the \({H^1(\mathbb{R}^3)}\) critical focusing semilinear wave equation. Duke Mathematical Journal, 147:1–53
Lions P.-L.: The concentration-compactness principle in the calculus of variations. The limit case. II. Revista Matemtica Iberoamericana (2) 1, 45–121 (1985)
Martel Y., Merle F.: Asymptotic stability of solitons for subcritical generalized KdV equations. Archive for Rational Mechanics and Analysis (3) 157, 219–254 (2001)
Martel Y., Merle F.: Stability of blow-up profile and lower bounds for blow-up rate for the critical generalized KdV equation. Annals of Mathematics (2) (1) 155, 235–280 (2002)
Merle F., Raphael P.: On universality of blow-up profile for L 2 critical nonlinear Schrödinger equation. Invented Mathematics (3) 156, 565–672 (2004)
Merle F., Raphael P.: Profiles and quantization of the blow up mass for critical nonlinear Schrödinger equation. Communications in Mathematical Physics (3) 253, 675–704 (2005)
F. Merle and L. Vega. Compactness at blow-up time for L 2 solutions of the critical nonlinear Schrödinger equation in 2D. International Mathematics Research Notices, (8) (1998), 399–425.
Shatah J., Shadi Tahvildar-Zadeh A.: On the stability of stationary wave maps. Communications in Mathematical Physics (1) 185, 231–256 (1997)
Struwe M.: Radially symmetric wave maps from (1 + 2)-dimensional Minkowski space to the sphere.. Mathematische Zeitschrift (3) 242, 407–414 (2002)
Struwe M.: Radially symmetric wave maps from (1 + 2-dimensional Minkowski space to general targets.. Calculus of Variations and Partial Differential Equations (4) 16, 431–437 (2003))
Talenti G.: Best constant in Sobolev inequality. Annals of Pure and Applied Mathematics 110, 353–372 (1976)
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T. Duyckaerts was partially supported by ERC Grant Dispeq. C. Kenig was partially supported by NSF Grant DMS-0968472.
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Duyckaerts, T., Kenig, C. & Merle, F. Profiles of bounded radial solutions of the focusing, energy-critical wave equation. Geom. Funct. Anal. 22, 639–698 (2012). https://doi.org/10.1007/s00039-012-0174-7
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DOI: https://doi.org/10.1007/s00039-012-0174-7