A reducibility result for a class of linear wave equations on Td

Abstract

We prove a reducibility result for a class of quasi-periodically forced linear wave equations on the d-dimensional torus Td of the form ∂tt v - v + P(ω t)[v] = 0 where the perturbation P(ω t) is a second order operator of the form P(ω t) = - a(ω t) - R(ω t), the frequency ω ∈ R is in some Borel set of large Lebesgue measure, the function a : T R (independent of the space variable) is sufficiently smooth and R(ω t) is a time-dependent finite rank operator. This is the first reducibility result for linear wave equations with unbounded perturbations on the higher dimensional torus Td. As a corollary, we get that the linearized Kirchhoff equation at a smooth and sufficiently small quasi-periodic function is reducible.