Spectral criteria for solutions of evolution equations and comments on reduced spectra

Abstract

We revisit the notion of reduced spectra sp F (φ) for bounded measurable functions φ ∈ L∞ (J,X), F⊂ L1loc(J,X). We show that it can not be obtained via Carleman spectra unless φ∈ BUC(J,X) and F ⊂ BUC(J,X). In section 3, we give two examples which seem to be of independent interest for spectral theory. In section 4, we prove a spectral criteria for bounded mild solutions of evolution equation (*) d u(t)dt= A u(t) + φ (t) , u(0)=x∈ X, t∈ J, where A is a closed linear operator on X and φ∈ L∞ (J, X) where J ∈\+,\.