Extension of $c_0(I)$-valued operators on spaces of continuous functions on compact lines
Volume 268 / 2023
Studia Mathematica 268 (2023), 259-289
MSC: Primary 46B26; Secondary 46E15, 54F05.
DOI: 10.4064/sm211120-2-6
Published online: 5 September 2022
Abstract
We investigate the problem of existence of a bounded extension to $C(K)$ of a bounded $c_0(I)$-valued operator $T$ defined on the subalgebra of $C(K)$ induced by a continuous increasing surjection $\phi :K\to L$, where $K$ and $L$ are compact lines. Generalizations of some of the 2015 results of Correa and Tausk about extension of $c_0$-valued operators are obtained. For instance, we prove that when a bounded extension of $T$ exists then an extension can be obtained with norm at most twice the norm of $T$. Moreover, the class of compact lines $L$ for which the $c_0$-extension property is equivalent to the $c_0(I)$-extension property for any continuous increasing surjection $\phi :K\to L$ is studied.
