Lineability of functions in C(K) with specified range
Abstract
This paper is inspired by the paper of Leonetti, Russo and Somaglia [Dense lineability and spaceability in certain subsets of ∞. Bull. London Math. Soc., 55: 2283--2303 (2023)] and the lineability problems raised therein. It concerns the properties of ∞ subsets defined by cluster points of sequences. Using the fact that the set of cluster points of a sequence x depends only on its equivalence class in ∞/c0 and that the quotient space ∞/c0 is isometrically isomorphic to C(βN), we are able to translate lineability problems from ∞ to C(βN). We prove that for a compact space K with properties similar to those of βN, the sets of continuous functions f in C(K) with rng(f)=ω and those f with rng(f)= c contain, up to zero function, an isometric copy of c0() for uncountable cardinal . Specializing those results to some closed subspaces K of βN we are able to generalize known results to their ideal versions.
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