Compact perturbations of operator semigroups

Abstract

We study lifting problems for operator semigroups in the Calkin algebra Q(H), our approach being mainly based on the Brown--Douglas--Fillmore theory. With any normal C0-semigroup (q(t))t≥ 0 in Q(H) we associate an extension ∈Ext(), where is the inverse limit of certain compact metric spaces defined purely in terms of the spectrum σ(A) of the generator of (q(t))t≥ 0. By using Milnor's exact sequence, we show that if each q(t) has a normal lift, then the question whether is trivial reduces to the question whether the corresponding first derived functor vanishes. With the aid of the CRISP property and Kasparov's Technical Theorem, we provide geometric conditions on σ(A) which guarantee splitting of . If is a perfect compact metric space, we obtain in this way a C0-semigroup (Q(t))t≥ 0 which lifts (q(t))t≥ 0 on dyadic rationals.