Atlas: An Open Mapping Theorem for Basis Separating Maps by Lawrence Narici

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

Organizers
Klaus D. Bierstedt, J. Schmets

An Open Mapping Theorem for Basis Separating Maps
by
Lawrence Narici
St. John's University, Jamaica, NY 11439, USA
Coauthors: Edward Beckenstein (St. John's University, Staten Island, New York)

As a consequence of the open mapping theorem, a continuous linear bijection H: X --> Y between Banach spaces X and Y must be a linear homeomorphism. The main result of this article is similar in form but makes no continuity assumptions on H: If X and Y have symmetric Schauder bases, and H is a ``basis separating'' linear bijection, then H is a linear homeomorphism. Given Banach spaces X and Y with Schauder bases {x_n} and {y_n}, respectively, we say that H: X --> Y,

H(\sum_{n in N}x(n) x_n) = \sum_{n in N}Hx(n) y_n,

is basis separating if for all elements x=\sum_{n in N}x(n) x_n and y=\sum_{n in N}y(n) x_n of X, x(n) y(n) = 0 for all n in N implies that Hx(n) Hy(n) = 0 for all n in N . We show that associated with a linear basis separating map H, there is a support map h: N --> N_\infty. The support map plays a crucial role in the development of the main results.

Date received: February 19, 2001