Resolvent and propagation estimates for Klein-Gordon equations with non-positive energy

Abstract

We study in this paper an abstract class of Klein-Gordon equations: \[ t2φ(t)- 2 k tφ(t)+ h φ(t)=0, \] where φ: , is a (complex) Hilbert space, and h, k are self-adjoint, resp. symmetric operators on . We consider their generators H (resp. K) in the two natural spaces of Cauchy data, the energy (resp. charge) spaces. We do not assume that the dynamics generated by H or K has any positive conserved quantity, in particular these operators may have complex spectrum. Assuming conditions on h and k which allow to use the theory of selfadjoint operators on Krein spaces, we prove weighted estimates on the boundary values of the resolvents of H, K on the real axis. From these resolvent estimates we obtain corresponding propagation estimates on the behavior of the dynamics for large times. Examples include wave or Klein-Gordon equations on asymptotically euclidean or asymptotically hyperbolic manifolds, minimally coupled with an external electro-magnetic field decaying at infinity.