Uniform Eberlein spaces and the finite axiom of choice

Abstract

We work in set-theory without choice . Given a closed subset F of [0,1]I which is a bounded subset of 1(I) ( resp. such that F ⊂eq 0(I)), we show that the countable axiom of choice for finite subsets of I, ( resp. the countable axiom of choice ) implies that F is compact. This enhances previous results where ( resp. the axiom of Dependent Choices ) was required. Moreover, if I is linearly orderable (for example I=), the closed unit ball of 2(I) is weakly compact (in ).