On calibers for Cp(X)

Abstract

We present new results regarding calibers in the function spaces Cp(X). Our main theorem is that Cp(X) is strongly Sanin whenever X is a submetrizable space; this improves an earlier result due to Tkachuk: Cp(X) is Sanin whenever X is a submetrizable space. Moreover, we give sufficient conditions to characterize the calibers of Cp(X) when X is a topological sum, and we calculate the calibers of Cp(X) when X = Π < λX is a product of non-trivial Tychonoff spaces with i-weight ≤ λ. Furthermore, we calculate the calibers of Cp(X) when X is an interval of ordinals and when X is the one-point λ-Lindel\"of extension of a discrete space of cardinality ≥ λ. This allows to give examples of compact Hausdorff spaces Z such that iw(Z)=+ and Cp(Z) does not have caliber iw(Z); and examples of spaces \Zα : α<cf()\ such that is a caliber for Cp(Zα) whenever α<cf() but it is not a caliber for Cp(α<cf() Zα).