A construction of blow up solutions for co-rotational wave maps

Abstract

The existence of co-rotational finite time blow up solutions to the wave map problem from R2+1 into N, where N is a surface of revolution with metric d2+g()2 dθ2, g an entire function, is proven. These are of the form u(t,r)=Q(λ(t)t)+R(t,r), where Q is a time independent solution of the co-rotational wave map equation -utt+urr+r-1ur=r-2g(u)g'(u), λ(t)=t-1-, >1/2 is arbitrary, and R is a term whose local energy goes to zero as t goes to 0.