A Semi-linear Energy Critical Wave Equation With Applications

Abstract

In this work we consider a semi-linear energy critical wave equation in Rd (3≤ d ≤ 5) \[ ∂t2 u - u = φ(x) |u|4/(d-2) u, (x,t)∈ Rd × R \] with initial data (u, ∂t u)|t=0 = (u0,u1) ∈ H1 × L2 ( Rd). Here the function φ ∈ C( Rd; (0,1]) converges to zero as |x| → ∞. We follow the same compactness-rigidity argument as Kenig and Merle applied on the Cauchy problem of the equation \[ ∂t2 u - u = |u|4/(d-2) u \] and obtain a similar result when φ satisfies some technical conditions. In the defocusing case we prove that the solution scatters for any initial data in the energy space H1 × L2. While in the focusing case we can determine the global behaviour of the solutions, either scattering or finite-time blow-up, according to their initial data when the energy is smaller than a certain threshold.