On the admissibility of observation operators for evolution families

Abstract

This paper is concerned with unbounded observation operators for non-autonomous evolution equations. Fix τ > 0 and let (A(t))t ∈ [0,τ] ⊂ L(D,X), where D and X are two Banach spaces such that D is continuously and densely embedded into X. We assume that the operator A(t) has maximal regularity for all t ∈ [0,τ] and that A(·) : [0,τ] L(D,X) satisfies a regularity condition (viz. relative p-Dini for some p ∈ (1,∞)). At first sight, we show that there exists an evolution family on X associated to the problem u(t) + A(t) u(t) = 0 t a.e. on [0,τ], u(0) = x ∈ X. Then we prove that an observation operator is admissible for A(·) if and only if it is admissible for each A(t) for all t ∈ [0,τ).