Construction of type II blowup solutions for the 1-corotational energy supercritical wave maps

Abstract

We consider the energy supercritical wave maps from Rd into the d-sphere Sd with d ≥ 7. Under an additional assumption of 1-corotational symmetry, the problem reduces to the one dimensional semilinear wave equation ∂t2 u = ∂2r u + (d-1)r∂r u - (d-1)2r2(2u). We construct for this equation a family of C∞ solutions which blow up in finite time via concentration of the universal profile u(r,t) Q(rλ(t)), where Q is the stationary solution of the equation and the speed is given by the quantized rates λ(t) cu(T-t)γ, ∈ N*, \;\; > γ = γ(d) ∈ (1,2]. The construction relies on two arguments: the reduction of the problem to a finite-dimensional one thanks to a robust universal energy method and modulation techniques developed by Merle, Rapha\"el and Rodnianski for the energy supercritical nonlinear Schr\"odinger equation, then we proceed by contradiction to solve the finite-dimensional problem and conclude using the Brouwer fixed point theorem.