Blow up dynamics for the 3D energy-critical Nonlinear Schr\"odinger equation

Abstract

We construct a two-parameter continuum of type II blow up solutions for the energy-critical focusing NLS in dimension d = 3. The solutions collapse to a single energy bubble in finite time, precisely they have the form u(t,x) = ei α(t)λ(t)12W(λ(t) x) + η(t, x ), t ∈[0, T), x ∈ R3, where W( x) = ( 1 + |x|23)-12 is the ground state solution, λ(t) = (T-t)- 12 - for suitable > 0 , α(t) = α0 (T - t) and T= T(, α0) > 0 . Further \|η(t) - ηT\|H1 H2 = o(1) as t T- for some ηT ∈ H1 ~ H2.