Completely determined Borel sets and measurability

Abstract

We consider the reverse math strength of the statement C-DM:"Every completely determined Borel set is measurable." Over WWKL0, we obtain the following results analogous to the previously studied category case. C-DM lies strictly between ATR0 and Lω1,ω-CA. Whenever M⊂eq 2ω is the second-order part of an ω-model of C-DM, then for every Z ∈ M, there is a R ∈ M such that R is 11-random relative to Z. On the other hand, without WWKL0, all sets have measure zero (as measured according to C-DM), and it follows vacuously that WWKL0 implies C-DM over RCA0.