Evolution Equations governed by Lipschitz Continuous Non-autonomous Forms

Abstract

We prove L2-maximal regularity of linear non-autonomous evolutionary Cauchy problem equationeq00 u (t)+A(t)u(t)=f(t) for \ a.e. t∈ [0,T], u(0)=u0, equation where the operator A(t) arises from a time dependent sesquilinear form a(t,.,.) on a Hilbert space H with constant domain V. We prove the maximal regularity in H when these forms are time Lipschitz continuous. We proceed by approximating the problem using the frozen coefficient method developed in ELKELA11, ELLA13 and LH. As a consequence, we obtain an invariance criterion for convex and closed sets of H.