Boundary values of resolvents of self-adjoint operators in Krein spaces

Abstract

We prove in this paper resolvent estimates for the boundary values of resolvents of selfadjoint operators on a Krein space: if H is a selfadjoint operator on a Krein space , equipped with the Krein scalar product ·| · , A is the generator of a C0-group on and I⊂ is an interval such that: itemize []1) H admits a Borel functional calculus on I, []2) the spectral projection I(H) is positive in the Krein sense, []3) the following positive commutator estimate holds: \[ u| [H, A]u≥ c u| u, \ u ∈ RanI(H), \ c>0. \] itemize then assuming some smoothness of H with respect to the group t A, the following resolvent estimates hold: \[ z∈ I ]0, ]\| A -s(H-z)-1 A-s\| <∞, \ s>\12. \] As an application we consider abstract Klein-Gordon equations \[ t2φ(t)- 2 k φ(t)+ hφ(t)=0, \] and obtain resolvent estimates for their generators in charge spaces of Cauchy data.