Maximal Regularity for Non-Autonomous Second Order Cauchy Problems

Abstract

We consider non-autonomous wave equations \[ \ aligned \& u(t) + (t) u(t) + (t)u(t) = f(t) t-a.e.\\ \&u(0)=u0,\, u(0) = u1. aligned . \] where the operators (t) and (t) are associated with time-dependent sesquilinear forms (t,.,.) and defined on a Hilbert space H with the same domain V. The initial values satisfy u0 ∈ V and u1 ∈ H. We prove well-posedness and maximal regularity for the solution both in the spaces V' and H. We apply the results to non-autonomous Robin-boundary conditions and also use maximal regularity to solve a quasilinear problem.