Full range of infinite point blow-up exponents for the critical generalized KdV equation

Abstract

For the quintic, mass critical generalized Korteweg-de Vries equation, for any ∈ (12, 1), we prove the existence of solutions in the energy space that blow up in finite time T>0 with the blow-up rate \|∂x u(t)\|L2 (T-t)- (infinite point blow-up). These solutions are constructed arbitrarily close to the family of solitons and correspond to the concentration of a soliton traveling at +∞ in space as t T. This complements the previous results obtained in the work of Martel, Merle, Rapha\"el in 2015 on infinite point exotic blow-up, which were valid under the technical restriction > 1113. The value = 12 corresponds to a critical case to be treated elsewhere. At the technical level, we implement a modification of the virial-energy functional, to allow all > 12 and simplify the proof of energy estimates.

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