Invariance of Convex Sets for Non-autonomous Evolution Equations Governed by Forms

Abstract

We consider a non-autonomous form :[0,T]× V× V where V is a Hilbert space which is densely and continuously embedded in another Hilbert space H. Denote by (t) ∈ (V,V') the associated operator. Given f ∈ L2(0,T, V'), one knows that for each u0 ∈ H there is a unique solution u∈ H1(0,T;V') L2(0,T;V) of u(t) + (t) u(t) = f(t), \, \, u(0) = u0. %align* %& u(t) + (t)u(t)= f(t)\ %& u(0)=u0. %align* This result by J. L. Lions is well-known. The aim of this article is to find a criterion for the invariance of a closed convex subset of H; i.e.\ we give a criterion on the form which implies that u(t)∈ for all t∈[0,T] whenever u0∈. In the autonomous case for f = 0, the criterion is known and even equivalent to invariance by a result proved in Ouh96 (see also Ouh05). We give applications to positivity and comparison of solutions to heat equations with non-autonomous Robin boundary conditions. We also prove positivity of the solution to a quasi-linear heat equation.