an:00936963
Zbl 0892.47040
van Neerven, J. M. A. M.
Individual stability of \(C_0\)-semigroups with uniformly bounded local resolvent
EN
Semigroup Forum 53, No. 2, 155-161 (1996).
00034230
1996
j
47D06
\(C_0\)-semigroups; individual stability; uniformly bounded local resolvent
In the spirit of \textit{L. Gearhart}'s theorem [Trans. Am. Math. Soc. 236, 385-394 (1978; Zbl 0371.47033)] the author proves the following individual stability theorem for strongly continuous semigroups \((T(t))\) on a Banach space X with generator A. If, for some \(x_0 \in X\), the map \(z \mapsto R(z,A)x_0\) has a bounded analytic extension to \(\{z:\text{Re}z > 0\}\) then \(\| T(t)R(\lambda, A)x_0\| \leq M(1 + t)\) for all \(t\geq 0\), some (all) \(\lambda \in \varrho(A)\) and some \(M \in \mathbb R_+\). As a corollary he obtains the recent theorem by \textit{L. Weis} and \textit{V. Wrobel} [Proc. Am. Math. Soc. 124, No. 12, 3663-3671 (1996; Zbl 0863.47027)].
R.Nagel (T??bingen)
Zbl 0863.47027; Zbl 0371.47033