A solution to the focusing 3d NLS that blows up on a contracting sphere

Abstract

We rigorously construct radial H1 solutions to the 3d cubic focusing NLS equation i∂t + + 2 ||2=0 that blow-up along a contracting sphere. With blow-up time set to t=0, the solutions concentrate on a sphere at radius t1/3 but focus towards this sphere at the faster rate t2/3. Such dynamics were originally proposed heuristically by Degtyarev-Zakharov-Rudakov (1975) and independently later in Holmer-Roudenko (2007), where it was demonstrated to be consistent with all conservation laws of this equation. In the latter paper, it was proposed as a solution that would yield divergence of the Lx3 norm within the "wide" radius |∇ u(t)|Lx2-1/2 but not within the "tight" radius |∇ u(t)|Lx2-2, the second being the rate of contraction of self-similar blow-up solutions observed numerically and described in detail in Chapter 7 of Sulem-Sulem (1998).