An effective analysis of the Denjoy rank

Abstract

We analyze the descriptive complexity of several 11 ranks from classical analysis which are associated to Denjoy integration. We show that VBG, VBG, ACG and ACG are 11-complete, answering a question of Walsh in case of ACG. Furthermore, we identify the precise descriptive complexity of the set of functions obtainable with at most α steps of the transfinite process of Denjoy totalization: if |·| is the 11-rank naturally associated to VBG, VBG or ACG, and if α<ω1ck, then \F ∈ C(I): |F| ≤ α\ is 02α-complete. These finer results are an application of the author's previous work on the limsup rank on well-founded trees. Finally, \(f,F) ∈ M(I)× C(I) : F∈ ACG and F'=f a.e.\ and \f ∈ M(I) : f is Denjoy integrable\ are 11-complete, answering more questions of Walsh.