PFA and complemented subspaces of ℓ∞/c0
Abstract
The Banach space $\ell_\infty/c_0$ is isomorphic
to the linear space of continuous functions on $\mathbb N^*$ with the
supremum norm, $C(\mathbb N^*)$. Similarly, the canonical
representation of the
$\ell_\infty$ sum of $\ell_\infty/c_0$ is the Banach space of
continuous
functions on the closure of any non-compact cozero subset of $\mathbb
N^*$. It is important to determine if there is a continuous
linear lifting of this Banach space to a complemented
subset of $C(\mathbb N^*)$. We show that PFA implies there is no such
lifting.
to the linear space of continuous functions on $\mathbb N^*$ with the
supremum norm, $C(\mathbb N^*)$. Similarly, the canonical
representation of the
$\ell_\infty$ sum of $\ell_\infty/c_0$ is the Banach space of
continuous
functions on the closure of any non-compact cozero subset of $\mathbb
N^*$. It is important to determine if there is a continuous
linear lifting of this Banach space to a complemented
subset of $C(\mathbb N^*)$. We show that PFA implies there is no such
lifting.
Full Text:
2. [PDF]DOI: https://doi.org/10.4115/jla.2016.8.2
This work is licensed under a Creative Commons Attribution 3.0 License.
Journal of Logic and Analysis ISSN: 1759-9008