Maximal Regularity for Evolution Equations Governed by Non-Autonomous Forms

Abstract

abstractabstract We consider a non-autonomous evolutionary problem \[ u (t)+(t)u(t)=f(t), u(0)=u0 \] where the operator (t):V V is associated with a form (t,.,.):V× V and u0∈ V. Our main concern is to prove well-posedness with maximal regularity which means the following. Given a Hilbert space H such that V is continuously and densely embedded into H and given f∈ L2(0,T;H) we are interested in solutions u ∈ H1(0,T;H) L2(0,T;V). We do prove well-posedness in this sense whenever the form is piecewise Lipschitz-continuous and symmetric. Moreover, we show that each solution is in C([0,T];V). We apply the results to non-autonomous Robin-boundary conditions and also use maximal regularity to solve a quasilinear problem.