Construction of multi-bubble solutions for the energy-critical wave equation in dimension four

Abstract

For any N≥ 2, we construct a global solution of the energy-critical focusing wave equation in dimension four which blows up in infinite time at N prescribed points z1,…,zN∈ R4, provided that the points form one orbit under a finite group of orthogonal symmetries. We denote by c:=2Σj k|zj-zk|-2>0 the corresponding interaction coefficient, which is independent of k. The common concentration scale satisfies \[ 1λ(t) = (9c4)1/3t2/3+O(t1/3) as t+∞ . \] This concentration rate comes from a genuinely four-dimensional effect: the borderline decay of the ground state makes the interaction between different bubbles enter the leading order parameter dynamics.