Non-Autonomous Forms and Invariance

Abstract

We generalize the Beurling--Deny--Ouhabaz criterion for parabolic evolution equations governed by forms to the non-autonomous, non-homogeneous and semilinear case. Let V, H are Hilbert spaces such that V is continuously and densely embedded in H and let A(t) V V be the operator associated with a bounded H-elliptic form a(t,.,.) V× V C for all t ∈ [0,T]. Suppose C ⊂ H is closed and convex and P H H the orthogonal projection onto C. Given f ∈ L2(0,T;V') and u0∈ C, we investigate whenever the solution of the non-autonomous evolutionary problem \[ u'(t)+A(t)u(t)=f(t), u(0)=u0, \] remains in C and show that this is the case if Pu(t) ∈ V and Re a(t,Pu(t),u(t)-Pu(t)) Re f(t), u(t)-Pu(t) for a.e.\ t ∈ [0,T]. Moreover, we examine necessity of this condition and apply this result to a semilinear problem.