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BMS-DMV LIEGE 2001
June 8-10, 2001
University of Liège
Liège, Belgium

Organizers
Klaus D. Bierstedt, J. Schmets

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A note on a theorem of Tacon
by
Sergio Falcon
University of Las Palmas de Gran Canaria
Coauthors: K. Sadarangani

In this paper we give the minimal conditions in a certain sense for the proofs of a theorem of Tacon and analogous results for some other classes of operators can be reproduced.

We prove that if M is a family of bounded, countable sets of a Banach space F, defining a structure of operators on F which is sequentially determined, then for a Banach space E and a sequence of operators (Tn) subset L(E, F), the following assertions are equivalent:
a) There exists n0 in N such that Tn0 is an M-operator
b) For every bounded sequence (xn) in E, there exists p in N such that {Tpxn: n in N} in M

Date received: March 8, 2001

Copyright © 2001 by the author(s). The author(s) of this document and the organizers of the conference have granted their consent to include this abstract in Atlas Conferences Inc. Document # cafv-75.