TY - JOUR
T1 - Inverse operator of the generator of a C-0-semigroup
AU - Gomilko, AM
AU - Zwart, H
AU - Tomilov, Y
N1 - This is the translation of the Russian orginal, same issue of the journal, page 35-50.
PY - 2007/8/31
Y1 - 2007/8/31
N2 - Let $A$ be the generator of a uniformly bounded $C_0$-semigroup in a Banach space $X$ such that $A$ has a trivial kernel and a dense range. The question whether $A^{-1}$ is a generator of a $C_0$-semigroup is considered. It is shown that the answer is negative in general for $X = \ell_p$, $p \in (1, 2) \cap (2,\infty)$. In the case when $X$ is a Hilbert space it is proved that there exist $C_0$-semigroups ($e^{tA})$, $t > 0$, of arbitrarily slow growth at infinity such that the densely defined operator $A^{-1}$ is not the generator of a $C_0$-semigroup.
AB - Let $A$ be the generator of a uniformly bounded $C_0$-semigroup in a Banach space $X$ such that $A$ has a trivial kernel and a dense range. The question whether $A^{-1}$ is a generator of a $C_0$-semigroup is considered. It is shown that the answer is negative in general for $X = \ell_p$, $p \in (1, 2) \cap (2,\infty)$. In the case when $X$ is a Hilbert space it is proved that there exist $C_0$-semigroups ($e^{tA})$, $t > 0$, of arbitrarily slow growth at infinity such that the densely defined operator $A^{-1}$ is not the generator of a $C_0$-semigroup.
UR - https://www.webofscience.com/api/gateway?GWVersion=2&SrcApp=utwente-ris&SrcAuth=WosAPI&KeyUT=WOS:000250726000009&DestLinkType=FullRecord&DestApp=WOS
U2 - 10.1070/SM2007v198n08ABEH003874
DO - 10.1070/SM2007v198n08ABEH003874
M3 - Article
SN - 1064-5616
VL - 198
SP - 1095
EP - 1110
JO - Sbornik : mathematics
JF - Sbornik : mathematics
IS - 7-8
ER -