On complemented copies of the space c0 in spaces Cp(X,E)

Abstract

We study the question for which Tychonoff spaces X and locally convex spaces E the space Cp(X,E) of continuous E-valued functions on X contains a complemented copy of the space (c0)p=\x∈Rω x(n)0\, both endowed with the pointwise topology. We provide a positive answer for a vast class of spaces, extending classical theorems of Cembranos, Freniche, and Doma\'nski and Drewnowski, proved for the case of Banach and Fr\'echet spaces Ck(X,E). Also, for given infinite Tychonoff spaces X and Y, we show that Cp(X,Cp(Y)) contains a complemented copy of (c0)p if and only if any of the spaces Cp(X) and Cp(Y) contains such a subspace.