On stability of type II blow up for the critical NLW on 3+1

Abstract

We show that the finite time type II blow up solutions for the energy critical nonlinear wave equation \[ u = -u5 \] on 3+1 constructed in earlier work by Krieger-Schlag-Tataru are stable along a co-dimension three manifold of radial data perturbations in a suitable topology, provided the scaling parameter λ(t) = t-1- is sufficiently close to the self-similar rate, i. e. >0 is sufficiently small. Our method is based on Fourier techniques adapted to time dependent wave operators of the form \[ -∂t2 + ∂r2 + 2r∂r +V(λ(t)r) \] for suitable monotone scaling parameters λ(t) and potentials V(r) with a resonance at zero.