On complemented copies of the space c0 in spaces Cp(X× Y)

Abstract

Cembranos and Freniche proved that for every two infinite compact Hausdorff spaces X and Y the Banach space C(X× Y) of continuous real-valued functions on X× Y endowed with the supremum norm contains a complemented copy of the Banach space c0. We extend this theorem to the class of Cp-spaces, that is, we prove that for all infinite Tychonoff spaces X and Y the space Cp(X× Y) of continuous functions on X× Y endowed with the pointwise topology contains either a complemented copy of Rω or a complemented copy of the space (c0)p=\(xn)n∈ω∈ Rω xn 0\, both endowed with the product topology. We show that the latter case holds always when X× Y is pseudocompact. On the other hand, assuming the Continuum Hypothesis (or even a weaker set-theoretic assumption), we provide an example of a pseudocompact space X such that Cp(X× X) does not contain a complemented copy of (c0)p. As a corollary to the first result, we show that for all infinite Tychonoff spaces X and Y the space Cp(X× Y) is linearly homeomorphic to the space Cp(X× Y)×R, although, as proved earlier by Marciszewski, there exists an infinite compact space X such that Cp(X) cannot be mapped onto Cp(X)×R by a continuous linear surjection. This provides a positive answer to a problem of Arkhangel'ski for spaces of the form Cp(X× Y). Another corollary asserts that for every infinite Tychonoff spaces X and Y the space Ck(X× Y) of continuous functions on X× Y endowed with the compact-open topology admits a quotient map onto a space isomorphic to one of the following three spaces: Rω, (c0)p or c0.