Boundedness and decay for the conformal wave equation in Schwarzschild-AdS under dissipative boundary conditions

Abstract

We study the conformal wave equation g ψ+ 2l2 ψ= 0 on 4-dimensional Schwarzschild--Anti de Sitter spacetimes under dissipative boundary conditions. We prove boundedness and decay of the non-degenerate energy of ψ at an arbitrary polynomial rate of (1+v)-n provided that we control the (up to) n-times T-commuted energy. This contrasts with the inverse logarithmic decay obtained under Dirichlet boundary conditions and is in line with the result obtained in the pure Anti-de Sitter case under dissipative boundary conditions. In particular, the decay is not affected by the additional trapping at the photon sphere.