Spectral mapping theorems of differentiable C0 semigroups
Abstract
Let (T(t))t≥ 0 be a C0 semigroup on a Banach space X with infinitesimal generator A. In this work, we give conditions for which the spectral mapping theorem σ*(T(t)) \0\=\eλ s, λ∈σ*(A)\ holds, where σ* can be equal to the essential, Browder and Kato spectrum. Also, we will be interested in the relations between the spectrum of A and the spectrum of the nth derivative T(t)(n) of a differentiable C0 semigroup (T(t))t≥0.
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