On the strength of weak compactness

Abstract

We study the logical and computational strength of weak compactness in the separable Hilbert space 2. Let weak-BW be the statement the every bounded sequence in 2 has a weak cluster point. It is known that weak-BW is equivalent to ACA0 over RCA0 and thus that it is equivalent to (nested uses of) the usual Bolzano-Weierstra principle BW. We show that weak-BW is instance-wise equivalent to the 02-CA. This means that for each 02 sentence A(n) there is a sequence (xi) in 2, such that one can define the comprehension functions for A(n) recursively in a cluster point of (xi). As consequence we obtain that the Turing degrees d > 0" are exactly those degrees that contain a weak cluster point of any computable, bounded sequence in 2. Since a cluster point of any sequence in the unit interval [0,1] can be computed in a degree low over 0', this show also that instances of weak-BW are strictly stronger than instances of BW. We also comment on the strength of weak-BW in the context of abstract Hilbert spaces in the sense of Kohlenbach and show that his construction of a solution for the functional interpretation of weak compactness is optimal.