On uniformly continuous surjections between function spaces
Abstract
We consider uniformly continuous surjections between Cp(X) and Cp(Y) (resp, Cp*(X) and Cp*(Y)) and show that if X has some dimensional-like properties, then so does Y. In particular, we prove that if T:Cp(X) Cp(Y) is a continuous linear surjection, then Y=0 if X=0. This provides a positive answer to a question raised by Kawamura-Leiderman [Problem 3.1]kl.
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