It is shown that the generator of every exponentially equicontinuous, uniformly continuous $C_0$--semigroup of operators in the class of quojection Fréchet spaces $X$ (which includes properly all countable products of Banach spaces) is necessarily everywhere defined and continuous. If, in addition, $X$ is a Grothendieck space with the Dunford--Pettis property, then uniform continuity can be relaxed to strong continuity. Two results, one of M. Lin and one of H.P. Lotz, both concerned with uniformly mean ergodic operators in Banach spaces, are also extended to the class of Fréchet spaces mentioned above. They fail to hold for arbitrary Fréchet spaces.
$C_0$--semigroups and mean ergodic operators in a class of Fréchet spaces
ALBANESE, Angela Anna;
2010-01-01
Abstract
It is shown that the generator of every exponentially equicontinuous, uniformly continuous $C_0$--semigroup of operators in the class of quojection Fréchet spaces $X$ (which includes properly all countable products of Banach spaces) is necessarily everywhere defined and continuous. If, in addition, $X$ is a Grothendieck space with the Dunford--Pettis property, then uniform continuity can be relaxed to strong continuity. Two results, one of M. Lin and one of H.P. Lotz, both concerned with uniformly mean ergodic operators in Banach spaces, are also extended to the class of Fréchet spaces mentioned above. They fail to hold for arbitrary Fréchet spaces.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
