Singularity formation for the two-dimensional harmonic map flow into S2

Abstract

We construct finite time blow-up solutions to the 2-dimensional harmonic map flow into the sphere S2, align* ut & = u + |∇ u|2 u in ×(0,T) \\ u &= on ∂ ×(0,T) \\ u(·,0) &= u0 in , align* where is a bounded, smooth domain in R2, u: ×(0,T) S2, u0: S2 is smooth, and = u0|∂. Given any points q1,…, qk in the domain, we find initial and boundary data so that the solution blows-up precisely at those points. The profile around each point is close to an asymptotically singular scaling of a 1-corrotational harmonic map. We build a continuation after blow-up as a H1-weak solution with a finite number of discontinuities in space-time by "reverse bubbling", which preserves the homotopy class of the solution after blow-up.